Plz help I’ll give brainliest

Plz Help Ill Give Brainliest

Answers

Answer 1

Answer:

2) 4/5

3) 3

Step-by-step explanation:

2) 4/8-3=4/5

3)5x-4=3x+2

2x=6

x=3

Answer 2

Answer:

2) 4/5

3)x=3

Step-by-step explanation:

1) 4/8-3= 4/5

2) 5x-4=3x+2

bring 3x to left side and bring -4 to right side (remember signs will be reversed that is 3x becomes -3x and -4 will be 4

5x-3x=4+2

2x=6

x=6/2

x=3

put 3 in place of x

5*3-4=3*3+2

15-4=9+2

11=11


Related Questions

Jackson and Cherie both drive taxicabs. Jackson charges a flat fee of $5 per fare plus $1 per mile. Cherie charges a flat fee of $3 per fare plus $2 per mile. They pick up two groups of passengers from the airport going to the same hotel. Let m represent the number of miles between the airport and the hotel. a) Represent Jackson's bill as a polynomial. b) Represent Cherie's bill as a polynomial. c) Write a new polynomial that represents Jackson's and Cherie's combined fares for the trip. d) If they both drove 22 miles, calculate their combined fares.

Answers

a) Jackson's bill can be represented by the polynomial f(m) = 5 + m.

b) Cherie's bill can be represented by the polynomial g(m) = 3 + 2m.

c) The combined fare for Jackson and Cherie can be represented by the polynomial h(m) = 8 + 3m.

d) If they both drove 22 miles, their combined fares would be $74.

a) Jackson's bill consists of a flat fee of $5 per fare plus an additional $1 per mile.

This can be represented by the polynomial f(m) = 5 + m, where m represents the number of miles between the airport and the hotel.

b) Cherie's bill consists of a flat fee of $3 per fare plus an additional $2 per mile.

This can be represented by the polynomial g(m) = 3 + 2m, where m represents the number of miles between the airport and the hotel.

c) To calculate the combined fare for Jackson and Cherie, we add their individual polynomial representations.

Therefore, the combined fare polynomial is h(m) = f(m) + g(m) = (5 + m) + (3 + 2m) = 8 + 3m.

d) If both Jackson and Cherie drove 22 miles, we can calculate their combined fares by substituting m = 22 into the combined fare polynomial, h(m) = 8 + 3m.

Thus, h(22) = 8 + 3(22) = 8 + 66 = 74.

Therefore, their combined fares would be $74.

Learn more about polynomial here:

https://brainly.com/question/11355579

#SPJ11

The solution of the system of differential equations:
dx / dt = -6x +5y + t
dy / dt = -5x +4y + 1

Answers

The solution to the system of differential equations dx/dt = -6x + 5y + t and dy/dt = -5x + 4y + 1 is given by the equations x(t) = C₁e⁻⁶ᵗ + C₂e⁴ᵗ - t - 1 and y(t) = C₁e⁻⁶ᵗ + C₂e⁴ᵗ + t + 2, where C₁ and C₂ are arbitrary constants.

To solve the system of differential equations dx/dt = -6x + 5y + t and dy/dt = -5x + 4y + 1, we can use the method of solving simultaneous linear first-order differential equations.
First, we solve for x(t):
Differentiating the equation dx/dt = -6x + 5y + t with respect to t, we get d²x/dt² = -6(dx/dt) + 5(dy/dt) + 1.Substituting the given expressions for dx/dt and dy/dt, we have d²x/dt² = -6(-6x + 5y + t) + 5(-5x + 4y + 1) + 1.
Simplifying, we get d²x/dt² = 36x - 30y - 6t + 25x - 20y - 5 + 1.
This simplifies further to d²x/dt² = 61x - 50y - 6t - 4.
Similarly, differentiating the equation dy/dt = -5x + 4y + 1 with respect to t, we get d²y/dt² = -5(dx/dt) + 4(dy/dt).
Substituting the given expressions for dx/dt and dy/dt, we have d²y/dt² = -5(-6x + 5y + t) + 4(-5x + 4y + 1).
Simplifying, we get d²y/dt² = 30x - 25y + 5t - 20x + 16y + 4.
This simplifies further to d²y/dt² = 10x - 9y + 5t + 4.So we have the system of equations d²x/dt² = 61x - 50y - 6t - 4 and d²y/dt² = 10x - 9y + 5t + 4.
By solving these second-order differential equations, we find that the general solution for x(t) is given by x(t) = C₁e⁻⁶ᵗ + C₂e⁴ᵗ - t - 1, and the general solution for y(t) is given by y(t) = C₁e⁻⁶ᵗ + C₂e⁴ᵗ + t + 2, where C₁ and C₂ are arbitrary constants.

learn more about system of differential equations here

https://brainly.com/question/32433624



#SPJ11

A circular mirror has a diameter of 10 inches, Part A what is the are, in square inches of the mirror? please give me the explanation also with the answer!!!

Answers

The area of the mirror is approximately 78.5 square inches.

The area of a circular mirror can be found using the formula:

A = π[tex]r^2[/tex]

where `A` is the area of the mirror and `r` is the radius of the mirror.

In this case, we are given that the diameter of the mirror is 10 inches, so the radius would be half of that, or 5 inches.

Plugging in the value for `r`:

A = π[tex](5)^2[/tex] = 25π

Therefore, the area of the mirror is 25π square inches. Alternatively, we could use a value of approximately 3.14 for π to get:

A ≈ 78.5

In general, the area of a circle is proportional to the square of its radius, so the area of a circle with twice the radius of this mirror would be four times as large, and so on.

For such more questions on area

https://brainly.com/question/25292087

#SPJ8




15. Give an example of disjoint closed sets F, F, such that 0 inf{|x; – xzl : x; € F;}.

Answers

The example of disjoint closed sets F and G such that inf{|x - y| : x ∈ F, y ∈ G} = 2 is F = {x ∈ ℝ : x ≥ 1} and G = {x ∈ ℝ : x ≤ -1}.

Whst is an an example of the disjoint closed sets?

Let's consider the set F = {x ∈ ℝ : x ≥ 1} and G = {x ∈ ℝ : x ≤ -1}. Both F and G are closed sets.

In order to show that they are disjoint, we can observe that for any x ∈ F, we have x ≥ 1, and for any x ∈ G, we have x ≤ -1. Therefore, there is no value of x that satisfies both conditions simultaneously, which means F and G have no common elements and are disjoint.

Now, let's calculate the infimum of the absolute difference |x - y| for all x ∈ F and y ∈ G:

inf{|x - y| : x ∈ F, y ∈ G}

Since F consists of values greater than or equal to 1, and G consists of values less than or equal to -1, the absolute difference between any x ∈ F and y ∈ G will always be greater than or equal to 2:

|x - y| ≥ |1 - (-1)| = 2

Therefore, the infimum of the absolute difference is 2.

In summary, the example of disjoint closed sets F and G such that inf{|x - y| : x ∈ F, y ∈ G} = 2 is F = {x ∈ ℝ : x ≥ 1} and G = {x ∈ ℝ : x ≤ -1}.

Learn more about sets on

https://brainly.com/question/13458417

#SPJ4




For each function, find the inverse function. Simplify your answers. f: x 9x -2 f-1(x) = 1 8 : x g++(x) = = 7x-3 X+5 h : x h'(x) = X - 3(5-4x) j : x ; (x) = = 2

Answers

The inverse function of f(x) = 9x - 2 is [tex]f^{(-1)x}[/tex] = (x + 2)/9. The inverse function of g(x) = 7x - 3 is [tex]g^{(-1)x}[/tex] = (x + 3)/7. The inverse function of h(x) = x - 3(5 - 4x) is [tex]h^{(-1)x}[/tex] = 13x - 15. The inverse function of j(x) = x + 5 is [tex]j^{(-1)x}[/tex] = x - 5.

Let's find the inverse functions for each given function:

a) f(x) = 9x - 2

To find the inverse function, we can follow these steps:

Replace f(x) with y: y = 9x - 2.

Swap x and y: x = 9y - 2.

Solve the equation for y: x + 2 = 9y.

Divide both sides by 9: (x + 2)/9 = y.

Replace y with [tex]f^{(-1)x}[/tex]: [tex]f^{(-1)x}[/tex]= (x + 2)/9.

Therefore, the inverse function of f(x) = 9x - 2 is [tex]f^{(-1)x}[/tex] = (x + 2)/9.

b) g(x) = 7x - 3

Following the same steps as above:

Replace g(x) with y: y = 7x - 3.

Swap x and y: x = 7y - 3.

Solve the equation for y: x + 3 = 7y.

Divide both sides by 7: (x + 3)/7 = y.

Replace y with [tex]g^{(-1)x}[/tex]: [tex]g^{(-1)x}[/tex]= (x + 3)/7.

Thus, the inverse function of g(x) = 7x - 3 is [tex]g^{(-1)x}[/tex] = (x + 3)/7.

c) h(x) = x - 3(5 - 4x)

Again, following the same steps:

Replace h(x) with y: y = x - 3(5 - 4x).

Swap x and y: x = y - 3(5 - 4x).

Solve the equation for y: x = y - 15 + 12x.

Collect like terms: 12x - y = 15 - x.

Solve for y: y = 12x + x - 15.

Combine like terms: y = 13x - 15.

Replace y with [tex]h^{(-1)x}[/tex]: [tex]h^{(-1)x}[/tex] = 13x - 15.

Thus, the inverse function of h(x) = x - 3(5 - 4x) is [tex]h^{(-1)x}[/tex] = 13x - 15.

d) j(x) = x + 5

Following the same steps as before:

Replace j(x) with y: y = x + 5.

Swap x and y: x = y + 5.

Solve the equation for y: y = x - 5.

Replace y with[tex]j^{(-1)x}[/tex]: [tex]j^{(-1)x}[/tex] = x - 5.

Therefore, the inverse function of j(x) = x + 5 is [tex]j^{(-1)x}[/tex] = x - 5.

Learn more about inverse function here:

https://brainly.com/question/32543045

#SPJ11

find the area of the given triangle. round your answer to the nearest tenth. do not round any intermediate computations. 18 62°

Answers

To find the area of the given triangle with a side length of 18 and an angle of 62 degrees, we can use the formula for the area of a triangle: A = 1/2 * base * height.

In this case, the base of the triangle is given as 18, but we need to find the height. To find the height, we can use the trigonometric relationship between the angle and the sides of the triangle. The height is equal to the length of the side opposite the given angle. Using trigonometry, we can determine the height by multiplying the length of the base by the sine of the angle: height = 18 * sin(62°).

Once we have the height, we can calculate the area using the formula: A = 1/2 * base * height. Plugging in the values, we get A = 1/2 * 18 * 18 * sin(62°). Finally, we round the answer to the nearest tenth to obtain the final result.

To learn more about triangle click here :

brainly.com/question/2773823

#SPJ11

A fence must be built to enclose a rectangular area of 45,000 ft². Fencing material costs $4 per foot for the two sides facing north and south and $8 per foot for the other two sides. Find the cost of the least expensive fence. The cost of the least expensive fence is $ (Simplify your answer.)

Answers

The cost of the least expensive fence is $54,000 is the correct answer.

Here we will find the cost of the least expensive fence to enclose a rectangular area of 45000 sq ft.

We have to find the length and width of the rectangular area, so that we can calculate the least expensive fence.

In order to solve the problem of finding the cost of the least expensive fence, let us first consider the formula for finding the perimeter of a rectangle, P = 2l + 2w where l is the length and w is the width.

Given the area of the rectangle is 45,000 square feet and the cost of fencing per foot is $4 for the two sides facing north and south and $8 for the other two sides. To minimize the cost, we assume that the rectangle is a square.

Therefore, l = w, and l^2 = 45000, then l = 150 and w = 150. So the perimeter of the square is P = 4l = 4(150) = 600 feet.

For the two sides facing north and south, the cost of fencing material is $4 per foot, and for the other two sides, the cost of fencing material is $8 per foot.

Therefore, the total cost of fencing is 2(4)lw + 2(8)lw = 8lw + 16lw = 24lw. Plug in l = w = 150 into 24lw and we get 24(150)(150) = $54000.

know more about rectangular area

https://brainly.com/question/31822659

#SPJ11

Let {Xt: t > 0} and {Yt: t≥ 0} be two martingales in respect to the same filtration. Prove that the process {Xt/Yt: t ≥ 0} is a supermartingale.

Answers

The two martingales will help to prove that supermartingale.

Let {Xt: t > 0} and {Yt: t≥ 0} be two martingales in respect to the same filtration.

To prove that the process {Xt/Yt: t ≥ 0} is a supermartingale, we can use the definition of a supermartingale.

Let Zt = Xt/Yt.

Then, Zt is a non-negative process (since Xt and Yt are both non-negative) and we need to show that E[Zt+1 | Ft] ≤ Zt for all t and all Ft ⊆ Fs

In order to do this, we first use the product rule of conditional expectation to write:

E[Zt+1 | Ft] = E[Xt+1/Yt+1 | Ft]

Now, since Xt and Yt are both martingales, we know that E[Xt+1 | Ft] = Xt and E[Yt+1 | Ft] = Yt.

So, we can rewrite the above expression as

E[Zt+1 | Ft] = Xt/Yt = Zt

Since Zt is non-negative, this implies that E[Zt+1 | Ft] ≤ E[Zt | Ft], which is the definition of a supermartingale.

Therefore, we have shown that the process {Xt/Yt: t ≥ 0} is a supermartingale.

#SPJ11

Let us know more about martingales :https://brainly.com/question/32506093.

Identify the population and propose an appropriate sample for the following survey question: How do the parents of the students at Rosedale Academy feel about visiting Canada?

Answers

Population: The population for this survey question would be the parents of the students at Rosedale Academy.

Sample: To obtain a representative sample of the parents' opinions, a stratified random sampling approach can be used. The school can divide the parents into different strata based on relevant factors such as grade level, nationality, or language spoken at home. Then, a random sample of parents can be selected from each stratum. This approach ensures that the sample represents the diversity within the parent population at Rosedale Academy. For example, if there are parents from different grade levels (e.g., elementary, middle, high school), the school can randomly select a proportionate number of parents from each grade level. Similarly, if there are parents from different nationalities or language backgrounds, the school can randomly select a proportionate number of parents from each group. By using stratified random sampling, the survey will capture the opinions of parents from different segments of the population, leading to a more comprehensive understanding of how parents at Rosedale Academy feel about visiting Canada.

learn more about  random sampling here:

https://brainly.com/question/32361491

#SPJ11

Fill in the table below. Function Analyzing the graph Graph (identify the asymptotes) lim f(x) = 3 Asymptote y=3 lim g(x) = 2 x-00 Asymptote y=2 lim g(x) = 0 X-3- Asymptote x=-3 lim f(x) =

Answers

The asymptotes for the given functions can be identified by using limits and analyzing the graphs.

Function Analyzing the graph Graph (identify the asymptotes) lim f(x) = 3 Asymptote y=3 lim g(x) = 2 x-00 Asymptote y=2 lim g(x) = 0 X-3- Asymptote x=-3 lim f(x) = 0The given table below shows the different functions and their asymptotes. FunctionAsymptoteLim f(x) = 3y = 3Lim g(x) = 2x → ∞y = 2Lim g(x) = 0x → -3x = -3Lim f(x) = 0No asymptote exists for the limit of f(x) as it approaches zero (0).Analyzing the graph:An asymptote is a line that a curve approaches but never touches. We can use limits to determine where vertical or horizontal asymptotes exist by looking at the limits of a function as it approaches a certain value or infinity. The asymptotes can also be identified by observing the graph. When we approach an asymptote, the function approaches a specific value, which is the equation of the asymptote.

Know more about asymptotes here:

https://brainly.com/question/32038756

#SPJ11

determine the value of `x` that makes the equation true. `\frac{12}{x}=\frac{8}{6}`

Answers

The value of x that makes the equation true is x = 9.

To solve the equation 12/X = 8/6 we can cross-multiply to eliminate the fractions.

By multiplying both sides of the equation by x, we get: 12= 8/6 x

Simplifying the right side of the equation, we have: 12= 4/3 x

To isolate x, we can multiply both sides of the equation by 3/4

3/4 × 12 = 3/4 × 4/3 × x

The 4 and 3 cancel out on the right side, resulting in: 9=x.

Therefore, the value of x that makes the equation true is x=9.

LEARN MORE ABOUT equation here: brainly.com/question/10724260

#SPJ11

Use the following probabilities to answer the question. It may be helpful to sketch a Venn diagram. P(A) = 0.51, P(B) = 0.39 and P(A and B) = 0.10. P(not B l not A)= __________

Answers

P(A) = 0.51, P(B) = 0.39 and P(A and B) = 0.10. P(not B l not A)= 0.67. The value of P(not B | not A) using the given probabilities is 0.67.

A Venn diagram is a useful visual representation to solve a given problem. The total probability of the sample space is 1. P(A) = 0.51, P(B) = 0.39, and P(A and B) = 0.10.

Using the formula,

P(A or B) = P(A) + P(B) - P(A and B), we can find the probability of A or B.

P(A or B) = 0.51 + 0.39 - 0.10= 0.80.

The probability of not A or B is:

P(not A or B) = 1 - P(A or B) = 1 - 0.80= 0.20

Now we can use the formula,

P(not B | not A) = P(not B and not A) / P(not A).

P(not B and not A) = P(not A or B) - P(B)

= 0.20 - 0.39

= -0.19P(not B | not A)

= (-0.19) / P(not A)

Using the formula, P(A) + P(not A) = 1, we can find the probability of not A.

P(not A) = 1 - P(A) = 1 - 0.51 = 0.49

P(not B | not A) = (-0.19) / P(not A) = (-0.19) / 0.49 = -0.3878 ≈ -0.39

Therefore, the value of P(not B | not A) using the given probabilities is 0.67.

You can learn more about the Venn diagram at: brainly.com/question/20795347

#SPJ11

Suppose that X is a random variable for which the moment generating function is given by
m(t) = e(^t^2+3t)for all t€R.
(a) Differentiate m(t) to determine E[X] and E[X^2]).
(b) What are the values of mean and variance for X?

Answers

The moment generating function of the random variable X is given by m(t) = e^(t^2+3t) for all t ∈ R.

(a) Differentiating m(t) with respect to t will give us the moments of X. The first derivative of m(t) is:

m'(t) = (2t+3)e^(t^2+3t)

we set t = 0 in m'(t):

m'(0) = (2(0)+3)e^(0^2+3(0)) = 3

Therefore, E[X] = 3.

we differentiate m'(t):

m''(t) = (2+2t)(2t+3)e^(t^2+3t)

Setting t = 0 in m''(t):

m''(0) = (2+2(0))(2(0)+3)e^(0^2+3(0)) = 6

Therefore, E[X^2] = 6.

(b) The mean and variance of X can be calculated based on the moments we obtained.

The mean of X is given by E[X] = 3.

The variance of X can be calculated using the formula:

Var(X) = E[X^2] - (E[X])^2

Substituting the values we found:

Var(X) = 6 - 3^2 = 6 - 9 = -3

Since the variance cannot be negative, it suggests that there might be an error or inconsistency in the given moment generating function. It is important to note that variance should always be a non-negative value.

To learn more about variance, click here: brainly.com/question/31432390

#SPJ11

To estimate the variance of fill at a cannery, 10 cans were selected at random and their contents are weighed. The following data were obtained ( in ounces): 7.96, 7.90, 7.98, 8.01, 7.97, 7.96, 8.03, 8.02, 8.04, 8.02. Construct a 90% confidence interval for estimating the variance assuming that contents are normally distributed

Answers

We can state with 90% certainty that the cannery's actual fill variance lies between 0.001 and 0.005.

What is the confidence interval?

Using the chi-square distribution;

Given the data:

n = 10 (number of cans)

Sample weights: 7.96, 7.90, 7.98, 8.01, 7.97, 7.96, 8.03, 8.02, 8.04, 8.02

Sample mean (x):

x = (7.96 + 7.90 + 7.98 + 8.01 + 7.97 + 7.96 + 8.03 + 8.02 + 8.04 + 8.02) / 10 = 7.987

Sample variance (s²):

s² = [(7.96 - 7.987)² + (7.90 - 7.987)² + ... + (8.02 - 7.987)²] / (n - 1)

s² = 0.0015

Chi-square critical values:

The chi-square critical values are:

χ²_lower = 3.325

χ²_upper = 19.023

Confidence interval:

The confidence interval for estimating the variance is given by:

[(n - 1) * s² / χ²_upper, (n - 1) * s² / χ²_lower]

Confidence interval = [(10 - 1) * 0.0015 / 19.023, (10 - 1) * 0.0015 / 3.325]

= [0.000748, 0.004949]

The 90% confidence interval for estimating the variance is [0.001, 0.005].

Learn more about confidence intervals at: https://brainly.com/question/20309162

#SPJ4

A real estate magazine reported the results of a regression analysis designed to predict the price (y), measured in dollars, of residential properties recently sold in a northern Virginia subdivision. One independent variable used to predict sale price is GLA, gross living area (x), measured in square feet. Data for 157 properties were used to fit the model Ely) = Bo + B1x. The results of the simple linear regression are provided below. y = 96,600 + 22.5x 5 = 6500 R 2 = 77 t = 6.1 (for testing B1) Interpret the value of the coefficient of determination, R2 There is a moderately strong positive correlation between sale price (y) and GLA (x). GLA (x)is linearly related to sale price (y) 77% of the time. 77% of the observed sale prices (y's) will fall within 2 standard deviations of the least squares line. 77% of the total variation in the sample sale prices can be attributed to the linear relationship between GLA (x) and (y).

Answers

The coefficient of determination, R^2, represents the proportion of the total variation in the dependent variable (sale price, y) that can be explained by the independent variable (gross living area, GLA, x) in a linear regression model.

In this case, the given value of R^2 is 0.77 (or 77%). This means that approximately 77% of the total variation in the sale prices of the properties in the sample can be attributed to the linear relationship between the gross living area and the sale price.

Interpreting this value:

- The value of 0.77 indicates a relatively high coefficient of determination. It suggests that the model is able to explain a significant portion of the variability in sale prices based on the variation in the gross living area.

- The higher the R^2 value, the more accurately the model can predict the sale prices based on the gross living area.

- In this case, the linear regression model with the gross living area as the independent variable accounts for 77% of the observed variation in sale prices.

It is important to note that the coefficient of determination, R^2, does not indicate causality but rather the strength of the linear relationship and the proportion of the variability explained by the model.

Visit here to learn more about coefficient of determination brainly.com/question/31891074

#SPJ11




a Define a relation a on N by (a,b) e Rif and only if EN. Which of the following properties does R satisfy? b Reflexive Symmetric Antisymmetric Transitive

Answers

A relation a on N/(a,b) e Rif and only if EN the properties that R satisfy is a. Reflexive

Checking whether R is reflexive requires seeing if (n, n) exists for every natural integer n. R is defined as "a is related to b if and only if an is an element of N," which implies that every natural number is connected to itself. R is reflexive as a result. As per definition of R, "a is related to b if and only if an is an element of N." As a result, if a and b are connected, an is an element of N. However, this does not necessarily indicate that b is a component of N. R is not symmetric.

Since a is related to b if and only if it is an element of N, applying to R, this indicates that the presence of (a, b) in R implies that an is an element of N. Nevertheless, this says nothing about whether or not (b, a) is in R. R is not symmetric or antisymmetric as a result. Since the statement "a is related to b if and only if an is an element of N," applies to R, then the presence of (a, b) in R indicates that an is an element of N. R's transitivity cannot be ascertained because this does not reveal whether or not relation (b, c) is in R.

Read more about relation on:

https://brainly.com/question/28827119

#SPJ4

Complete Question:

Define a relation a on N/(a,b) e Rif and only if EN. Which of the following properties does R satisfy?

a. Reflexive

b. Symmetric

c. Antisymmetric

d. Transitive

Use the distributive property (FOIL) to determine each product. Show your steps. (2-5 marks each) a) (2 + 5y)2 b)2(2a + 3b) + c) 2x(x2 + x - 1) d) 3(x - 2y)(x + y) e) (2a - 3)(3a? + 5a - 2) Math 10-C: Unit 2: - Assignme f) (x2 + 2x - 1)(x2 - 2x + 1) g) (2x + 3) - 4x(x + 4)(3x - 1)

Answers

Distributive property also known as FOIL i.e. First, Outer, Inner and Last is an algebraic expression used to multiply two or more terms together.

Using distributive property (FOIL) to determine each product:

A. (2 + 5y)²

= (2 + 5y)² = (2 + 5y)(2 + 5y)

= 2 * 2 + 2 * 5y + 5y * 2 + 5y * 5y

= 4 + 10y + 10y + 25y²

= 4 + 20y + 25y²

B. 2(2a + 3b)²

= 2(2a + 3b)² = 2(2a + 3b)(2a + 3b)

= 2 * 2a * 2a + 2 * 2a * 3b + 2 * 3b * 2a + 2 * 3b * 3b

= 4a² + 12ab + 12ab + 18b²

= 4a² + 24ab + 18b²

C. 2x(x²+ x - 1)

= 2x(x² + x - 1) = 2x * x² + 2x * x + 2x * (-1)

= 2x³ + 2x² + (-2x)

= 2x³ + 2x² - 2x

D. 3x(x - 2y)(x + y)

= 3x(x - 2y)(x + y) = 3x * x * x + 3x * x * y + 3x * (-2y) * x + 3x * (-2y) * y

= 3x³ + 3x²y - 6xy² - 6x²y

E. (2a - 3)(3a² + 5a - 2)

= (2a - 3)(3a² + 5a - 2) = 2a * 3a² + 2a * 5a + 2a * (-2) - 3 * 3a² - 3 * 5a - 3 * (-2)

= 6a³ + 10a² - 4a - 9a² - 15a + 6

= 6a³ + (10a² - 9a²) + (-4a - 15a) + 6

= 6a³ + a² - 19a + 6

F. (x² + 2x - 1)(x² - 2x + 1)

= (x² + 2x - 1)(x² - 2x + 1) = x² * x² + x² * (-2x) + x² * 1 + 2x * x² + 2x * (-2x) + 2x * 1 - 1 * x² - 1 * (-2x) - 1 * 1

= x⁴ - 2x³ + x² + 2x³ - 4x² + 2x - x² + 2x - 1

= x⁴ - 3x² + 4x - 1

G. (2x + 3) - 4x(x + 4)(3x - 1)

= 4x(x + 4)(3x - 1) = 4x * 3x² + 4x * (-1) + 4x * 12x + 4x * 4

= 12x³ - 4x + 48x² + 16x

= (2x + 3) - 4x(x + 4)(3x - 1) = 2x + 3 - (12x³ - 4x + 48x² + 16x)

= 2x + 3 - 12x³ + 4x - 48x² - 16x

= -12x³ - 44x² - 10x + 3

To learn more about Distributive property:

https://brainly.com/question/6276874

#SPJ4

Use a software program or a graphing utility with matrix capabilities to find the transition matrix from B to B'. B = {(2,5), (1, 2)}, B' = {(2,5), (1,5)}

Answers

The transition matrix from basis B to basis B' is a 2x2 matrix with the elements [1 0; 3 1].

To find the transition matrix from basis B to basis B', we need to express the basis B' vectors in terms of the basis B vectors. Let's label the basis B vectors as v1 and v2, and the basis B' vectors as w1 and w2.

Given B = {(2, 5), (1, 2)} and B' = {(2, 5), (1, 5)}, we can express w1 and w2 in terms of v1 and v2 as follows:

w1 = 2v1 + 0v2

w2 = 3v1 + 1v2

To obtain the transition matrix, we arrange the coefficients of v1 and v2 in each equation into a matrix. The first column corresponds to the coefficients of v1, and the second column corresponds to the coefficients of v2. Therefore, the transition matrix from B to B' is:

[2 0;

3 1]

This 2x2 matrix represents the linear transformation that maps vectors from the basis B to the basis B'.

Learn more about transition matrix here:

https://brainly.com/question/32572810

#SPJ11

Use the Laplace transform to solve the given IVP. y"+y' - 2y = 3 cos (3t) - 11sin (3t), y(0) = 0,y'(0) = 6. Note: Write your final answer in terms of your constants

Answers

After considering the given data we conclude the solution to the given IVP is [tex]y(t) = (-1/6)sin(3t) + (1/3)e^{t} + (1/6)e^{(-2t)} .[/tex]

To evaluate the given IVP [tex]y"+y' - 2y = 3 cos (3t) - 11sin (3t), y(0) = 0, y'(0) = 6[/tex]applying Laplace transform,

we can take the Laplace transform of both sides of the equation, applying the fact that the Laplace transform of a derivative is given by

[tex]L{y'} = s_Y(s) - y(0) and L{y"} = s^2_Y(s) - s_y(0) - y'(0).[/tex]

Taking the Laplace transform of both sides of the equation, we get:

[tex]s^2_Y(s) - sy(0) - y'(0) + s_Y(s) - y(0) - 2_Y(s) = 3_L{cos(3t)} - 11_L{sin(3t)}[/tex]

Staging the Laplace transforms of cos(3t) and sin(3t), we get:

[tex]s^2_Y(s) - 6s + s_Y(s) - 0 - 2_Y(s) = 3(s/(s^2 + 9)) - 11(3/(s^2 + 9))[/tex]

Applying simplification on the right-hand side, we get:

[tex]s^2_Y(s) + s_Y(s) - 2_Y(s) = (3_s - 33)/(s^2 + 9)[/tex]

Combining like terms on the left-hand side, we get:

[tex]s^2_Y(s) + s_Y(s) - 2_Y(s) = (3_s - 33)/(s^2 + 9)[/tex]

[tex]Y(s)(s^2 + s - 2) = (3_s - 33)/(s^2 + 9)[/tex]

Solving for Y(s), we get:

[tex]Y(s) = (3_s - 33)/(s^2 + 9)(s^2 + s - 2)[/tex]

To evaluate the inverse Laplace transform of Y(s), we can apply partial fraction decomposition:

[tex](3s - 33)/(s^2 + 9)(s^2 + s - 2) = A/(s^2 + 9) + B/(s - 1) + C/(s + 2)[/tex]

Applying multiplication on both sides by [tex](s^2 + 9)(s - 1)(s + 2),[/tex] we get:

[tex]3s - 33 = A(s - 1)(s + 2) + B(s^2 + 9)(s + 2) + C(s^2 + 9)(s - 1)[/tex]

Staging s = 1, s = -2, and s = i3, we get:

A = -1/6, B = 1/3, C = 1/6

Hence, we can write Y(s) as:

[tex]Y(s) = (-1/6)/(s^2 + 9) + (1/3)/(s - 1) + (1/6)/(s + 2)[/tex]

Taking the inverse Laplace transform of Y(s), we get:

[tex]y(t) = (-1/6)sin(3t) + (1/3)e^t + (1/6)e^{(-2t)}[/tex]

To learn more about Laplace transform

https://brainly.com/question/29583725

#SPJ4

If i=.0055 compounded monthly, what is the annual interest rate? a. 0.011 b. 0.60 c. 0,066 d. 0,055

Answers

If i=.0055 compounded monthly, the annual interest rate is 0.066. So, correct option is C.

To determine the annual interest rate when the interest is compounded monthly, we need to consider the relationship between the monthly interest rate (i) and the annual interest rate (r).

The formula for converting the monthly interest rate to an annual interest rate can be expressed as:

(1 + r) = (1 + i)ⁿ

where r is the annual interest rate, i is the monthly interest rate, and n is the number of compounding periods in a year.

In this case, the monthly interest rate is given as i = 0.0055, and since interest is compounded monthly, n = 12 (12 months in a year).

Substituting the values into the formula:

(1 + r) = (1 + 0.0055)¹²

To solve for r, we can rearrange the equation:

r = (1 + 0.0055)¹² - 1

Evaluating this expression:

r ≈ 0.066

Therefore, the annual interest rate is approximately 0.066, which corresponds to option c).

To learn more about interest click on,

https://brainly.com/question/30929349

#SPJ4

Determine all solutions of the given equation. Express your answer(s) using radian measure.

2 tan²x+sec² x - 2 = 0

a. x= 1/3 + k, where k is any integer
b. x= n/6+ nk, where k is any integer
c. x = 2n/3 + nk, where k is any integer
d. x = 5/6 + mk, where k is any integer
e. none of these

Answers

The solution to the given equation, 2 tan²x + sec²x - 2 = 0, is x = 1/3 + k, where k is any integer. This option (a) satisfies the equation and is expressed in terms of the given variable x. Therefore, option (a) is the correct answer.

To understand why option (a) is the solution, let's analyze the equation. We can rewrite the equation as:

2 tan²x + sec²x - 2 = 0.

Using the trigonometric identity, sec²x = 1 + tan²x, we can substitute sec²x with 1 + tan²x:

2 tan²x + (1 + tan²x) - 2 = 0.

Simplifying further, we have:

3 tan²x - 1 = 0.

Rearranging the equation, we get:

tan²x = 1/3.

Taking the square root of both sides, we find:

tan x = ± √(1/3).

The solutions for x can be found by taking the inverse tangent (arctan) of ± √(1/3). By evaluating arctan(± √(1/3)), we find that the solutions are:

x = 1/3 + kπ, where k is any integer.

This aligns with option (a) in the given answer choices. Therefore, the correct solution is x = 1/3 + k, where k is any integer.

Learn more about square root here: https://brainly.com/question/29286039

#SPJ11

Random variables X and Y are identically distributed random variables (not necessarily independent). We define two new random variables U = X + Y and V = X-Y. Compute the covariance coefficient ouv JU,V = = E[(U - E[U])(V - E[V])] =

Answers

Considering the random variables X and Y, the covariance coefficient Cov(U,V) = E[(U - E[U])(V - E[V])] is given by E(X²) - E(Y²).

Given that the random variables X and Y are identically distributed random variables (not necessarily independent).

We are to compute the covariance coefficient between U and V where U = X + Y and V = X-Y.

Covariance between U and V is given by;

            Cov (U,V) = E [(U- E(U)) (V- E(V))]

The expected values of U and V can be obtained as follows;

             E (U) = E(X+Y)E(U) = E(X) + E(Y) [Since X and Y are identically distributed]

             E(U) = 2E(X).....................(1)

Similarly,

               E(V) = E(X-Y)E(V) = E(X) - E(Y) [Since X and Y are identically distributed]

               E(V) = 0.........................(2)

Covariance can also be expressed as follows;

              Cov (U,V) = E (UX) - E(U)E(X) - E(UY) + E(U)E(Y) - E(VX) + E(V)E(X) + E(VY) - E(V)E(Y)

Since X and Y are identically distributed random variables, we have;

      E(UX) = E(X²) + E(X)E(Y)E(UY) = E(Y²) + E(X)E(Y)E(VX) = E(X²) - E(X)E(Y)E(VY) = E(Y²) - E(X)E(Y)

On substituting the respective values, we have;

      Cov (U,V) = E(X²) - [2E(X)]²

On simplifying further, we obtain;

  Cov (U,V) = E(X²) - 4E(X²)

    Cov (U,V) = -3E(X²)

Therefore, the covariance coefficient

    Cov(U,V) = E[(U - E[U])(V - E[V])] is given by;

    Cov(U,V) = E(UV) - E(U)E(V)

                     = [E{(X+Y)(X-Y)}] - 2E(X) × 0

      Cov(U,V) = [E(X²) - E(Y²)]

       Cov(U,V) = E(X²) - E(Y²)

Hence, the covariance coefficient Cov(U,V) = E[(U - E[U])(V - E[V])] is given by E(X²) - E(Y²).

To know more about random variables, visit:

https://brainly.com/question/30789758

#SPJ11

find the y coordinate of a point on the line y=2x + 3 that is closest to the point 0,7

Answers

To find the y coordinate of a point on the line y = 2x + 3 that is closest to the point (0, 7), we need to follow the steps below:

Step 1: We have the equation of the line y = 2x + 3, which can also be written in slope-intercept form as y = mx + b, where m is the slope of the line and b is the y-intercept of the line.

Step 2: Find the slope of the line by comparing its equation with y = mx + b. From the equation, we can see that m = 2.

Step 3: Since we have the slope of the line, we can find the equation of a line perpendicular to it that passes through the point (0, 7). A line perpendicular to a line with slope m has a slope of -1/m.

Therefore, the slope of the perpendicular line is -1/2.

The equation of the perpendicular line passing through (0, 7) is y - 7 = (-1/2)(x - 0).

Simplifying, we get y = -x/2 + 7.

Step 4: The point of intersection of the line y = 2x + 3 and the line y = -x/2 + 7 is the point on the line y = 2x + 3 that is closest to the point (0, 7). Solving the system of equations y = 2x + 3 and y = -x/2 + 7, we get x = 1 and y = 5.

Step 5: Therefore, the y coordinate of the point on the line y = 2x + 3 that is closest to the point (0, 7) is 5.

To know more about point of intersection refer to:

https://brainly.com/question/29185601

#SPJ11

what are the mean and standard deviation of the sampling distribution of the difference in sample proportions pˆd−pˆe ? show your work and label each value.

Answers

The standard deviation (σd) of the sampling distribution of the difference in sample proportions is calculated as follows: σd = sqrt((pd(1 - pd) / n1) + (pe(1 - pe) / n2))

To calculate the mean and standard deviation of the sampling distribution of the difference in sample proportions (pd - pe), we need the following information:

pd: Sample proportion of the first group

pe: Sample proportion of the second group

n1: Sample size of the first group

n2: Sample size of the second group

The mean (μd) of the sampling distribution of the difference in sample proportions is given by:

μd = pd - pe

The standard deviation (σd) of the sampling distribution of the difference in sample proportions is calculated as follows:

σd = sqrt((pd(1 - pd) / n1) + (pe(1 - pe) / n2))

Note: The square root symbol represents the square root operation.

Make sure to substitute the appropriate values for pd, pe, n1, and n2 into the formulas to obtain the numerical results.

Please provide the values of pd, pe, n1, and n2 so that I can perform the calculations for you.

Visit here to learn more about standard deviation brainly.com/question/29115611

#SPJ11

A $2,600 loan at 7.1% was repaid by two equal payments made 45 days and 90 days after the date of the loan. Determine the amount of each payment. Use the loan date as the focal date. (Use 365 days a year. Do not round intermediate calculations and round your final answer to 2 decimal places.)

Answers

The amount of each payment is $1322.76

What is simple interest?

Simple interest is an interest charge that borrowers pay lenders for a loan.

Simple interest is expressed as;

I = P× R × T/100

where P is the principal

R is the rate and

T is the time

The principal = $2,600

rate is 7.1%

time is 90 days = 90/365 years

I = (2600 × 7.1 × 90)/365 × 100

I = 1661400/36500

I = $45.52

The total amount that will be repaid

= $2600+ 45.52

= $ 2645.52

Therefore the amount of each payment

= $2645.52/2

= $1322.76

learn more about simple interest from

https://brainly.com/question/25793394

#SPJ1

Which statement explains how you could use coordinate geometry to prove the opposite sides of a quadrilateral are parallel?
Use the slope formula to prove the slopes of the opposite sides are the same.
Use the slope formula to prove the slopes of the opposite sides are opposite reciprocals.
Use the distance formula to prove the lengths of the opposite sides are the same.
Use the distance formula to prove the midpoints of the opposite sides are the same.

Answers

The correct statement that explains how you could use coordinate geometry to prove the opposite sides of a quadrilateral are parallel is:

- Use the slope formula to prove the slopes of the opposite sides are the same.

By calculating the slopes of the opposite sides of the quadrilateral using the coordinates of their endpoints, if the slopes are equal, it indicates that the lines are parallel.

The slope formula is used to calculate the slope (or gradient) of a line between two points. It can be expressed as:

m = (y2 - y1) / (x2 - x1)

where (x1, y1) and (x2, y2) are the coordinates of two distinct points on the line, and 'm' represents the slope of the line.

This formula gives the ratio of the change in the y-coordinates to the change in the x-coordinates, indicating the steepness or incline of the line.

Visit here to learn more about slope formula brainly.com/question/28553357

#SPJ11

Find a proposition with three variables p, q, r that is always false. Use a truth table or the laws of logic to show that your proposition is a contradiction.

Answers

As we can see from the truth table, regardless of the truth values of p, q, and r, the proposition p ∧ ¬p always evaluates to false. Therefore, it is a contradiction.

One proposition with three variables p, q, r that is always false is:

p ∧ ¬p

This proposition states that p is true and not true simultaneously, which is a contradiction.

Let's construct a truth table to demonstrate that this proposition is always false:

Note: Find the attached image for the truth table.

The proposition "p ∧ ¬p" is a logical contradiction because it asserts that a statement p is both true and not true at the same time. In logic, a contradiction is a statement that cannot be true under any circumstances.

To demonstrate this, we can use a truth table to analyze all possible combinations of truth values for the variables p, q, and r. In every row of the truth table, we evaluate the proposition "p ∧ ¬p" and observe that it always evaluates to false, regardless of the truth values of p, q, and r.

This consistent evaluation of false confirms that the proposition is a contradiction, as it makes an assertion that is inherently contradictory. In logic, contradictions have no possible truth value assignments and are always false.

As we can see from the truth table, regardless of the truth values of p, q, and r, the proposition p ∧ ¬p always evaluates to false. Therefore, it is a contradiction.

Learn more about Truth Table at

brainly.com/question/30588184

#SPJ4

This is the same scenario as the previous question: An environmental psychologist is interested in determining whether attitudes toward climate change vary by age. She surveys 200 people from four different generations (50 people from each generation) about their understanding of climate change. What is df within? 3 O 196 O 200 O 199

Answers

The researcher surveys 200 people from four different generations, with 50 people from each generation. The question asks about the degree of freedom within the study design. The correct answer is 199.

To determine the degrees of freedom within the study, we need to understand the concept of degrees of freedom in statistical analysis. Degrees of freedom represent the number of values that are free to vary in a statistical calculation.

In this case, the researcher surveys 200 people from four different generations, with 50 people from each generation. To calculate the degrees of freedom within the study, we subtract 1 from the total sample size. Since there are 200 individuals surveyed, the degrees of freedom within the study is 200 - 1 = 199.

The reason we subtract 1 is because when we have a sample, we typically use sample statistics to estimate population parameters. In this scenario, we are estimating the variation within the sample, so we need to account for the fact that one degree of freedom is lost when estimating the sample mean.

Therefore, the correct answer is 199, representing the degrees of freedom within the study design.

Learn more about degrees here:

https://brainly.com/question/15689447

#SPJ11

X
3
9
13
20
y
9
27
39
60
Show your work for finding the value of k below
point)

Answers

The constant k for the proportional relationship in this problem is given as follows:

k = 3.

What is a proportional relationship?

A proportional relationship is a relationship in which a constant ratio between the output variable and the input variable exists.

The equation that defines the proportional relationship is a linear function with slope k and intercept zero presented as follows:

y = kx.

The slope k is the constant of proportionality, representing the increase or decrease in the output variable y when the constant variable x is increased by one.

The constant for this problem, considering the table, is given as follows:

k = 60/20 = ... = 27/9 = 3.

A similar problem, also featuring proportional relationships, is presented at https://brainly.com/question/7723640

#SPJ1

910 randomly sampled registered voters from Tampa, FL were asked if they thought workers who have illegally entered the US should be (i) allowed to keep their jobs and apply for US citizenship, (ii) allowed to keep their jobs as temporary guest workers but not allowed to apply for US citizenship, or (iii) lose their jobs and have to leave the country. The results of the survey by political ideology are shown below. Political ideology Conservative Mod Liberal Total rate 120 113 126 101 28 45 278 262 350 20 910 57 121 179 citi (ii) Guest worker (iii Leave the country Response (iv) Not sure 37 (a) What percent of these Tampa, FL voters identify themselves as conservatives? (b) What percent of these Tampa, FL voters are in favor of the citizenship option? (c) What percent of these Tampa, FL voters identify themselves as conservatives and are in favor of the citizenship option? (d) What percent of these Tampa, FL voters who identify themselves as conservatives are also in favor of the citizenship option? What percent of moderates share this view? What percent of liberals share this view? (e) Do political ideology and views on immigration appear to be independent? Explain your reasoning

Answers

(a) Approximate statistical analysis 13.19% of Tampa, FL voters identify themselves as conservatives.

(b) Approximately 59.34% of Tampa, FL voters are in favor of the citizenship option.

(c) Approximately 30.55% of conservative voters in Tampa, FL are in favor of the citizenship option.

(d) Percentage of conservatives in favor: 79.43%, moderates in favor: 100%, liberals in favor: 51.14%.

(e) Political ideology and views on immigration appear to be dependent, as the percentage in favor of the citizenship option varies across different ideologies.

(a) To find the percentage of voters who identify themselves as conservatives, we divide the number of conservative voters (120) by the total number of voters surveyed (910) and multiply by 100:

Percentage of conservatives = (120 / 910) × 100 ≈ 13.19%

Therefore, approximately 13.19% of the Tampa, FL voters identify themselves as conservatives.

(b) To find the percentage of voters in favor of the citizenship option, we sum the counts for options (i) and (ii) and divide by the total number of voters surveyed:

Percentage in favor of citizenship option = ((278 + 262) / 910) × 100 ≈ 59.34%

Therefore, approximately 59.34% of the Tampa, FL voters are in favor of the citizenship option.

(c) To find the percentage of conservative voters who are in favor of the citizenship option, we divide the count of conservative voters in favor of the citizenship option (278) by the total number of voters surveyed and multiply by 100:

Percentage of conservative voters in favor of citizenship option = (278 / 910) × 100 ≈ 30.55%

Therefore, approximately 30.55% of the Tampa, FL voters who identify themselves as conservatives are in favor of the citizenship option.

(d) To find the percentage of conservatives, moderates, and liberals who are in favor of the citizenship option, we divide the count of each group in favor of the citizenship option by the total count for that group:

Percentage of conservatives in favor of citizenship option = (278 / 350) × 100 ≈ 79.43%

Percentage of moderates in favor of citizenship option = (262 / 262) × 100 = 100%

Percentage of liberals in favor of citizenship option = (179 / 350) × 100 ≈ 51.14%

Therefore, approximately 79.43% of conservatives, 100% of moderates, and 51.14% of liberals share the view in favor of the citizenship option.

(e) To determine if political ideology and views on immigration appear to be independent, we can compare the percentages of each group in favor of the citizenship option. If the percentages are similar across all political ideologies, it suggests independence.

Learn more about the statistical analysis at

https://brainly.com/question/30154483

#SPJ4

Other Questions
How many ways are there to choose a selection of 3 vegetablesfrom a display of 10 vegetables at a cafeteria? true/false. The below Threshold Reprogramming for procurement, either max in or max out, has been limited to only $20 million or only 20%. mary smith would like to invest in 10 t-bills that will have a maturity value of $1,000. the bills have a stated interest rate of 2 percent. what would be the purchase price of these t-bills? True or False:A CDS is a standardized contract that could be used by partiesto trades of a credit derivatives contract. . what is the ph of a 0.015 m aqueous solution of barium hydroxide (ba(oh)2)? a) 12.25 b) 1.82 c) 12.48 d) 1.52 e) 10.41 Dec 31, 2020 $58,500 Cash 63,000 Notes Receivable 121,500 Supplies & Inventory 54,000 Prepaid expense 81,000 Long-term investments 144,000 Machines and tools (45,000) Accumulated depreciation-equipment Total Assets $639,000 $477,000 Liabilities & Stockholders' Equity Accounts payable $ 76,500 $ 31,500 Bonds payable (long-term) 166,500 211,500 Common Stock 180,000 103,500 Retained Earnings 216,000 130,500 Total Liabilities & Stockholders' Equity $639,000 $477,000 Income Statement Information (2021): 1. Net income for the year ending December 31, 2021 is $130,500. 2. Depreciation expense is $18,000. 3. There is a loss of $9,000 resulted from the sale of long-term investment. Additional information (2021): 1. All sales and purchases of inventory are on account (or credit). 2. Received cash for the sale of long-term investments that had a cost of $81,000, yiel 3. Cash dividends paid is $45,000. 4. The company purchased new machines and tools for $22,500 cash, Assets Dec 31, 2021 $351,000 72,000 81,000 31,500 0 166,500 (63,000) Introduction of the selected e-commerce business that ventures in fashion industryClear introduction of the retail sectors covering all of the following: Name of the company Address of the company Start-up year Web address why did the revolutionairies burn down the chateau chatper 23 a tale of two cities Calculate the pH at the equivalence point for the titration of 0.230 M methylamine (CH3NH2) with 0.230 M HCl. The Kb of methylamine is 5.0 104.What is the pKa of the indicator?What is the color of this indicator in a solution with pH = 6? Compute Z, corresponding to P28 for standard normal curve. Random variable X is normally distributed with mean 36 and standard deviation. Find the 80 percentile. A coin is tossed 478 times. Use Binomial Distribution to approximate the probability of getting less than 246 tails. Which one of the following is NOT an example of discrete data? Answer (A)Number of households watching the Home Shopping Network. (B)Number of employees reporting in sick. (C)Number of miles between New York City and Chicago. (D)Number of members of the Denver Lions Club. (E)Number of family members. The t-value that I obtained (two-tailed probability) was p = .042. Which of these would be true based on that result? a. There is a 4.2% chance that we made a type I error. b. There is a 2.1% chance that we made a type I error. c. There is a 4.2% chance that we made a type II error. d. There is a 2.1% chance that we made a type II error You will begin with a relatively standard calculation. Consider a concave spherical mirror with a radius of curvature equal to 60.0 centimeters. An object 6.00 centimeters tall is placed along the axis of the mirror, 45.0 centimeters from the mirror. You are to find the location and height of the image.What is the focal length fff of this mirror?Now use the spherical mirror equation to find the image distance sFind the magnification mmm, using sss and sFinally, use the magnification to find the height of the image yyy'.Look at the signs of your answers to determine which of the following describes the image formed by this mirror:a. real and uprightb. real and invertedc. virtual and uprightd. virtual and inverted Which of the following describes the Twenty-Fourth Amendment?a. Abolition of slaveryb. Women's suffragec. Prohibition of poll taxesd. Right to bear arms the big five factors theory of personality is the view that personality is made up of group of answer choices ocean. drama, humor, fear, intelligence, and friendship. experiences, innate qualities, learned behaviors, reactions/actions, and expectations. biological predisposition, environmental influences, personal preferences, cognitive abilities, and social likeability. you've lost communications within your infrastructure to crucial intranet sites. users can't connect. you get on the servers, and the websites work flawlessly. what could be the problem? Propane is used as a fuel source on many barbeque grills. What is undergoing reduction during the burning of propane while grilling? Propane combustion: CH3CH2CH3 + O2 CO2 + H2O a) H2O b) O2 c) CH3CH2CH3 O d) CO2 __________ is the elapsed time beginning with the initiation of production and ending with the cash collection of receivables from the sale of the product. a toaster draws a current of 9.0 a when it is connected to a 110-v ac line. a. what is the power consumption of this toaster? b. what is the resistance of the heating element in the toaster? Which of the following is true about the governing of aquaculture in Canada?Select one:a. The federal government manages all licence and permit programs that relate to aquacultureb. Nova Scotia is the only province where aquaculture is federally regulatedc. Aquaculture legislation attempts to balance the economic value of the fisheries industry with the need to protect the environmentd. The federal government has sole law-making authority relating to aquaculture