The partial quotients that could be added to find 777 - 21 are 30 and 7.
To find the partial quotients that could be added to find 777 - 21, we can perform long division.
_____
21 | 777
We start by dividing 777 by 21:
The first partial quotient is 30.
Multiply 30 by 21, which gives 630.
Subtract 630 from 777, resulting in 147.
Bring down the next digit (7) and append it to 147.
Divide 147 by 21, yielding a partial quotient of 7.
Multiply 7 by 21, which gives 147.
Subtract 147 from 147, resulting in 0.
Therefore, the partial quotients that could be added to find 777 - 21 are 30 and 7.
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Martin recorded the low temperatures at his house for one week. The temperatures are shown below.
-7, -3, 4, 1, 2, 8, 7
Approximately what was the average low temperature for the week?
Α. 7
B. "1
C. 1
D "8
Slove the system of the linear equations by either sus substitution or elimination 8x-12y=20 4x-4y=-4
Answer:
x = -8 and y = -7
Step-by-step explanation:
I will solve your system by substitution.
(You can also solve this system by elimination.)
8x−12y=20;4x−4y=−4
Step: Solve8x−12y=20for x:
8x−12y+12y=20+12y(Add 12y to both sides)
8x=12y+20
8x
8
=
12y+20
8
(Divide both sides by 8)
x=
3
2
y+
5
2
Step: Substitute
3
2
y+
5
2
forxin4x−4y=−4:
4x−4y=−4
4(
3
2
y+
5
2
)−4y=−4
2y+10=−4(Simplify both sides of the equation)
2y+10+−10=−4+−10(Add -10 to both sides)
2y=−14
2y
2
=
−14
2
(Divide both sides by 2)
y=−7
Step: Substitute−7foryinx=
3
2
y+
5
2
:
x=
3
2
y+
5
2
x=
3
2
(−7)+
5
2
x=−8(Simplify both sides of the equation)
If you left $25.00 on your table for a $21.50 meal, what was the percent of the tip?
A.15.0%
B.14.0%
C.18.4
D.16.3
Answer:
I THINK it would be B.
Step-by-step explanation:
I’m very sorry if I’m wrong.
Answer:
16.3%
Step-by-step explanation:
21.5 times 0.163= 3.5
What is the slope of the line connecting the pair of points (0,7) (4,12)
Answer: 5/4
Step-by-step explanation: That should be right because I have big brain. Mark brainlist please :)
here are the options
∠2and∠4
∠1and∠5
∠3and∠6
Answer:
∠1and∠5
Step-by-step explanation:
Hello There!
The image shown below shows an example of what corresponding angles look like
Properties of corresponding angles
Must be on the same side of the transversalMust be congruentangles 2 and 4 are on the same side of the transversal however they are supplementary angles not congruent
angles 2 and 4 are an example of adjacent angles therefore this is not the answer
angles 1 and 5 are on the same side of the transversal and they are most definitely congruent
This might be our answer but lets check the last answer just to be sure
Angles 3 and 6 are congruent but they are not on the same side of the transversal
angles 3 and 6 are an example of alternate interior angles therefore this is not the correct answer
So we can conclude that angles 1 and 5 are corresponding angles
Danny has a scale drawing of his house. If
3 inches (in) on the scale drawing equals
7 feet on the real house, what is the actual
height of the house?
5.4 in
Answer:
151.2
Step-by-step explanation:
7x12=84
84/3=28
28x5.4=151.2
The probability of event A is Pr(A)=1/3 The probability of the union of event A and event B, namely A UB, is Pr(AUB)=5/6 Suppose that event A and event B are disjoint. Pr(B) = [....]
Given that the probability of event A is Pr(A) = 1/3 and the probability of the union of event A and event B, namely AUB, is Pr(AUB) = 5/6. The probability of event B is Pr(B) = 2/3.
Suppose that event A and event B are disjoint.
The probability of event B is Pr(B) = 1/2.
To find the probability of event B.
For disjoint events A and B, we know that A ∩ B = Φ (empty set).
Thus, we can express the union of A and B as: AUB = A + B, where A and B are disjoint.
In general, the probability of the union of two events can be expressed as: P(AUB) = P(A) + P(B) - P(A ∩ B).
For disjoint events, the intersection of the events is always an empty set.
Thus, P(A ∩ B) = 0.
Using this information, we can write:
P(AUB) = P(A) + P(B) - P(A ∩ B)
= P(A) + P(B) - 0
= P(A) + P(B)
Given P(A) = 1/3 and P(AUB) = 5/6, we can solve for P(B) as follows:
5/6 = P(A) + P(B)
=> P(B) = 5/6 - P(A)
=> P(B) = 5/6 - 1/3
=> P(B) = 2/3
Thus, the probability of event B is Pr(B) = 2/3.
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Find the slope of the line?
Answer:
m=3/4
Step-by-step explanation:
First, let us remind ourselves of the slope formula: m=rise/run=([tex]y_{2}[/tex]-[tex]y_{1}[/tex])/([tex]x_{2}[/tex]-[tex]x_{1}[/tex])
Let's pick two points from the graph to work with. Let's do (3,-6) and (-1,-9).
And let 3=[tex]x_{1}[/tex], -6=[tex]y_{1}[/tex], -1=[tex]x_{2}[/tex], -9=[tex]y_{2}[/tex].
1. Substitute the values into the slope formula: [-9-(-6)]/(-1-3)
2. simplify the expression: [-9-(-6)]/(-1-3)=(-9+6)/-4=-3/-4=3/4
3. As a result, the slope of the line is 3/4
Consider the system of equations shown below 2x₁ + 3x₂ + 3x3 = 20 3x₁ +5x₂ + 2x3 = 9 -x₁ + 3x₂ + 5x3 = 4. What is the coefficient matrix for this system of equations?
The coefficient matrix is a square matrix with dimensions equal to the number of variables in the system of equations.
The coefficient matrix is a matrix of the coefficients of the variables in a system of linear equations.
Now, we arrange these coefficients in a matrix format by placing them row-wise. This gives us the coefficient matrix:
[tex]2x + 3y + 3x3 = 20[/tex]
[tex]3x + 5y + 2x3 = 9[/tex]
[tex]-x + 3y + 5x3 = 4[/tex]
Each row of the coefficient matrix corresponds to an equation in the system, and each column represents the coefficients of a specific variable (x₁, x₂, x₃).
In summary, the coefficient matrix for the given system of equations is:
[tex]| 2 3 3 |[/tex]
[tex]| 3 5 2 |[/tex]
[tex]|-1 3 5 |[/tex]
This matrix provides a compact representation of the coefficients in the system, which can be further used for various operations and calculations.
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Phil has 5 times as many toy race cars as Richard has. Phil has 425 toy race cars. How many race cars does Richard have? *
Answer:
85
Step-by-step explanation:
425 divided by 8= 85
Answer:
He as 85 race cars.
Step-by-step explanation:
Just divide 425 by 5 and you have your answer.
Let X and Y be two continuous random variables with joint probability density function Calculate the positive constant b. Show the result with at least two decimal places. 5 -bcx cb - bzycb f(x,y) = 0 otherwise
The positive constant b is 0. This is obtained by setting the coefficient of the xy^2 term to zero in the equation derived from equating the integral of the joint probability density function to 1.
To compute the positive constant b, we need to calculate the integral of the joint probability density function (pdf) over the entire probability space and set it equal to 1 since it represents a valid probability density.
∫∫ f(x, y) dx dy = 1
Since the joint pdf is defined as:
f(x, y) = 5 - bcx * cb - bzycb
And it is zero otherwise, we can set up the integral as follows:
∫∫ (5 - bcx * cb - bzycb) dx dy = 1
To solve this integral, we need to determine the limits of integration. Since the joint pdf is not specified outside of the equation, we assume it is defined for all real values of x and y.
∫∫ (5 - bcx * cb - bzycb) dx dy = ∫∫ 5 - bcx * cb - bzycb dx dy
Integrating with respect to x first:
∫ (5x - bcx^2/2 * cb - bzy * cb) ∣∣ dy = 1
Now integrating with respect to y:
(5xy - bcxy^2/2 * cb - bzy^2/2 * cb) ∣∣ dy = 1
Since this equation holds for all real values of x and y, we can ignore the limits of integration.
Next, we can solve for b by equating the integral to 1 and simplifying:
(5xy - bcxy^2/2 * cb - bzy^2/2 * cb) = 1
Simplifying further:
5xy - bcxy^2/2 - bzy^2/2 = 1
Now, we can compare the coefficients of the terms on both sides of the equation:
- bc/2 = 0 (since there is no xy^2 term on the right-hand side)
Solving for b:
bc = 0
Since we are looking for a positive constant b, we can conclude that b = 0.
Therefore, the positive constant b is 0.
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Let p be a real number with 0 < p < 1, and n an integer which is greater than or equal to one. Recall that a binomial random variable X is one for which Prob(X = k): = (*) p* (1 k (1 − p)n-k for k = 0,1, n, and Prob(X x) for any x other than one of these n+1 = possible values.
a. In the case n 3 and p = 3/4, compute E(X) and Var(X).
b. Using (a) as a model case, compute E(X) and Var(X) for any value of p and n. (Hint: Write the formula from the binomial theorem and use differentiation.)
c. What is the value of p such that Var(X) is the smallest?
d. For any t > 0, compute E(etx). (Hint: Use the binomial theorem.)
The expected value E(X) of a binomial random variable X can be calculated as n * p, and the variance Var(X) can be calculated as n * p * (1 - p). These formulas can be generalized for any values of p and n, and the value of p that minimizes the variance can be found by setting the derivative of Var(X) with respect to p equal to zero.
a. In part (a), we are given specific values for n (3) and p (3/4). The expected value E(X) of a binomial random variable X can be calculated as n * p, which gives us:
3 * 3/4
= 2.25.
The variance Var(X) can be calculated as n * p * (1 - p), which gives us:
3 * 3/4 * (1 - 3/4)
= 0.5625.
b. In part (b), we generalize the calculation of E(X) and Var(X) for any value of p and n. Using the binomial theorem, we can expand (p + (1 - p))ⁿ and differentiate it to find the coefficients for E(X) and Var(X).
c. To find the value of p that minimizes the variance Var(X), we can take the derivative of Var(X) with respect to p binomial, set it equal to zero, and solve for p. This will give us the value of p that minimizes the variance.
d. For any t > 0, we can calculate E(e^(tx)) using the binomial theorem by substituting e^t for p in the expansion of (p + (1 - p))ⁿ. This will give us the expected value of the exponential of tx.
Therefore, the expected value E(X) of a binomial random variable X can be calculated as n * p, and the variance Var(X) can be calculated as n * p * (1 - p). These formulas can be generalized for any values of p and n, and the value of p that minimizes the variance can be found by setting the derivative of Var(X) with respect to p equal to zero.
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At a certain university, the average cost of books was $330 per
student last semester and the population standard deviation was $75. This
semester a sample of 50 students revealed an average cost of books of $365 per
student. The Dean of Students believes that the costs are greater this semester.
What is the test value for this hypothesis?
The test value for this hypothesis is 3.0.
What is the test value for the hypothesis that the average cost of books is greater this semester at a certain university?The test value for this hypothesis can be calculated using the formula for a one-sample t-test:
test value = (sample mean - population mean) / (sample standard deviation / sqrt(sample size))
Population mean (last semester) = $330Sample mean (this semester) = $365Sample size = 50Population standard deviation = $75Calculating the test value:
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In the figure shown, what is the measure of the indicated angle?
Answer:
60 degrees
Step-by-step explanation:
Each triangle needs to add up to 180 total degrees. 70+50=120,
180
-
120
___
60
The product of three consecutive non-zero integers is taken. Which statement must be true?
Select one:
O A. The third consecutive integer must be even,
B. The product must be odd,
C. Two of the three integers must be even.
D. The product must be even.
E. Two of the three integers must be odd.
©
Answer:
d
Step-by-step explanation:
integer is a whole number
imagine the sum of the first set of 3 integers = 4 + 5 + 6
product = 4 x 5 x 6 = 120
imagine the sum of the 2nd set of 3 integers = 6 + 7 + 8 = 21
6 x 7 x 8 = 3364
The price of n tickets to a concert is 8n + 9 dollars. What is the cost in dollars for 7 tickets to the concert
Answer: 65
Step-by-step explanation:
8nn+7 is your given expression. Plug in 7 for n, the number of tickets: 8(7)+9=56+9=65
Need Help which one is it???
Answer:
the blue one but not sure
Answer:
the third one i think
Step-by-step explanation:
What is the slope of a line perpendicular to the line y=2/3 x + 3 ( just find the slope)
A group of 5 friends sold lemonade. If they sold each cup for $0.50 on Friday and for $0.45 on each other day of the week, how much money did each friend make if they split the money evenly?
Day Number of cups
Monday 15
Tuesday 8
Wednesday 5
Thursday 11
Friday 23
Answer:
69
Step-by-step explanation:
Answer:
Step-by-step explanation:
62.00
Joe earns a monthly salary of 250 plus a commission on his total sales. Last month his total sales were $7,289 and he earned a total of $1,275. What is his commission rate?
Answer: Joe earns a monthly salary of 250 plus a commission on his total sales. Last month his total sales were $7,289 and he earned a total of $1,275. What is his commission rate?
Step-by-step explanation:
250 + $7,289 + $1,275 = 8814
−8x 4y>3 6x−7y<−5 is (2,3) a solution of the system?
The ordered pair (2,3) is not a solution of the system
How to determine if (2,3) a solution of the system?From the question, we have the following parameters that can be used in our computation:
−8x + 4y > 3
6x - 7y < −5
The solution is given as
(2, 3)
Next, we test this value on the system
So, we have
−8(2) + 4(3) > 3
-4 > 3 --- false
This means that (2,3) is not a solution of the system
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A train travels along a horizontal line according to the function s(t) = –13 + 3t2 – 4t – 4 where t is measured in hours and s is measured in miles. What is the velocity of the train after 4 hours?
The velocity of the train after 4 hours is 20 miles per hour.
To find the velocity of the train after 4 hours, we need to differentiate the given function s(t) with respect to t.
Velocity is the derivative of position with respect to time.
That is,v(t) = ds(t)/dtTo differentiate s(t) = –13 + 3t² – 4t – 4, we differentiate each term separately.v(t) = d/dt(-13) + d/dt(3t²) - d/dt(4t) - d/dt(4)v(t) = 0 + 6t - 4
The velocity of the train after 4 hours is given by substituting t = 4 in the above equation.v(4) = 6(4) - 4 = 20
The velocity of the train after 4 hours is 20 miles per hour.To sum up, the velocity of the train after 4 hours is 20 miles per hour.
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Consider the curve defined by 2x2+3y2−4xy=36 .
(a) Show that ⅆyⅆx=2y−2x3y−2x .
(b) Find the slope of the line tangent to the curve at each point on the curve where x=6
(c) Find the positive value of x at which the curve has a vertical tangent line. Show the work that leads to your answer.
(a) `dy/dx = (2y - 2x)/(3y - 2x)`.
(b) The slope of the tangent line at points where x = 6 is 0.
(c) the curve has a vertical tangent line when x = (3/2)y.
(a) To show that `dy/dx = (2y - 2x)/(3y - 2x)`, we need to find the derivative of `y` with respect to `x`. We can do this by implicitly differentiating the given equation.
Differentiating both sides of the equation with respect to `x`, we get:
4x(dx/dx) + 6y(dy/dx) - 4[(dx/dx)y + x(dy/dx)] = 0
Simplifying the equation, we have:
4x + 6y(dy/dx) - 4xy - 4xy - 4x(dy/dx) = 0
Rearranging the terms and combining like terms, we get:
(6y - 4x)(dy/dx) = 8x - 8xy
Dividing both sides by (6y - 4x), we obtain:
dy/dx = (8x - 8xy)/(6y - 4x)
Simplifying further, we have:
dy/dx = (2x(4 - 4y))/(2(3y - 2x))
Canceling out the common factors, we get:
dy/dx = (2y - 2x)/(3y - 2x)
Therefore, `dy/dx = (2y - 2x)/(3y - 2x)`.
(b) To find the slope of the tangent line at the points where x = 6, substitute x = 6 into the expression we found for `dy/dx` in part (a):
dy/dx = (2(6) - 2(6))/(3y - 2(6))
= 0/(3y - 12)
= 0
The slope of the tangent line at points where x = 6 is 0.
(c) To find the value of x at which the curve has a vertical tangent line, we need to find the point(s) where the slope `dy/dx` is undefined. In other words, we need to find the values of x where the denominator of `dy/dx` becomes zero.
Setting the denominator equal to zero and solving for x:
3y - 2x = 0
2x = 3y
x = (3/2)y
So, the curve has a vertical tangent line when x = (3/2)y.
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Write 3^4 in expanded form. (3^4 means 3 raised to the fourth power.)
A: 3x3
B :3x3x3
C: 3x3x3x3
D: 3x3x3x3x3
Answer:
c because 3.3.3.3 is 3 to the 4th power expanded
Compute the Laplace transform of the function f on (0,0) defined by f(t) = { i Se4 0 3 Give your answer as a function in the variable s for s > 0. L(f)(s) =___
The Laplace transform of the function f on (0,0) defined by f(t) = i Se^4t is L(f)(s) = i S / (2s-4).
Given function is f(t) = i Se^4t
Here, Laplace transform of the function f is given by:
L(f)(s) = ∫[0,∞) e^(-st) f(t) dt
On substituting the given function in the above equation, we get:
L(f)(s) = ∫[0,∞) e^(-st) i Se^(4t) dt
L(f)(s) = i S ∫[0,∞) e^(t(4-s)) dt
We know that the Laplace transform of e^(at) is 1/(s-a).
Therefore, Laplace transform of e^(t(4-s)) = 1/(s - (4-s)) = 1/(2s - 4).
Therefore,L(f)(s) = i S * ∫[0,∞) e^(t(4-s)) dt
L(f)(s) = i S * 1/(2s-4) * [-e^(-(4-s)t)]_0^∞
L(f)(s) = i S * 1/(2s-4) * [0 - (-1)] (since the exponentials evaluated at ∞ is zero)
L(f)(s) = i S * 1/(2s-4) * 1
L(f)(s) = i S / (2s-4)
Therefore, the Laplace transform of the function f on (0,0) defined by f(t) = i Se^4t is L(f)(s) = i S / (2s-4).
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Pls help this is sooOOOOOOO annoying!!
(07.06)Number line with closed circle on 9 and shading to the left.
Which of the following inequalities best represents the graph above?
a > 9
a < 9
a ≤ 9
a ≥ 9
Answer:
a ≤ 9
Step-by-step explanation:
Closed circle means ≤ or ≥
Shading to the left means left direction < or ≤
The inequality sign that has both is: ≤
a ≤ 9
Answer:
The answer is C
Step-by-step explanation:
I took the test and I got it right
What is the solution to the equation below?
0.5n = 6
It's 12 because if you divide 6 by 0.5 you should get 12, so basically use the opposite operation.
Hope that helps!
A particular high school claims that its students have unusually high math SAT scores. A random sample of 50 students from this school was selected, and the mean math SAT score was 544. Is the high school justified in its claim? Explain since it within the range of a usual event, namely within of the mean of the because the score) sample means (Round to two decimal places as needed)
The school is not justified to make this claim because of the reasons defined.
The following is a statement that might be made about the high school to justify its claim No, because the z-score of Z = 1.06 is not uncommon because it does not fall within the range of a typical event, namely within 2 standard deviations of the sample mean.
It has been given to us that:
μ = 511
σ = 119
Sample size (n) = 55
and
s = 119 / √55
= 16.046
As we all know,
Only when z > 2 then, the high school's allegation is valid and warranted.
To locate,
Z's value is
So,
Z = ( X - μ )/σ
by applying the Central Limit Theorem to the values,
z = ( 528 - 511 ) / 16.046
= 1.06
Since, z < 2, as a result, the allegation is unjustified.
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Correct question:
The average math SAT score is 511 with a standard deviation of 119. A particular high school claims that its students have unusually high math SAT scores. A random sample of 55 students from this school was selected, and the mean math SAT score was 528. Is the high school justified in its claim? Explain. ▼ No Yes , because the z-score ( nothing) is ▼ unusual not unusual since it ▼ does not lie lies within the range of a usual event, namely within ▼ 1 standard deviation 2 standard deviations 3 standard deviations of the mean of the sample means. (Round to two decimal places as needed.)
suppose a hand of four cards is drawn from a STANDARD DECK of playing cards with replacement , determine the probability of exactly one card is jack:
Therefore, the probability of exactly one card being jack when a hand of four cards is drawn from a standard deck of playing cards with replacement is 0.073 or 7.3%.
Suppose a hand of four cards is drawn from a standard deck of playing cards with replacement, the probability of exactly one card being jack can be determined using the following steps:Step 1: Determine the total number of possible outcomes when four cards are drawn from a standard deck of 52 cards with replacement. The total number of possible outcomes = 52 × 52 × 52 × 52 = 7,311,616.Step 2: Determine the total number of ways in which exactly one card can be a jack. There are four jacks in a standard deck of 52 cards, so the total number of ways in which exactly one card can be a jack = 4 × 48 × 48 × 48 = 53,333,632.Step 3: Determine the probability of exactly one card being jack. Probability of exactly one card being jack = Total number of ways in which exactly one card can be a jack / Total number of possible outcomes= 53,333,632/ 7,311,616 = 7.28 ≈ 0.073 or 7.3%.Therefore, the probability of exactly one card being jack when a hand of four cards is drawn from a standard deck of playing cards with replacement is 0.073 or 7.3%.
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8. The 2% solution of tetracaine hydrochloride is already isotonic. How many milliliters of a 0.9% solution of . sodium chloride should be used in compounding the prescription? Tobramycin 0.5% Tetracaine hydrochloride Sol. 2% 15 mL Sodium chloride qs Purified water ad 30 mL Make isoton, sol. Sig. for the eye
To make the 2% solution of tetracaine hydrochloride isotonic, a 0.9% solution of sodium chloride should be used.
The amount of the 0.9% sodium chloride solution needed can be calculated by setting up a proportion based on the concentration percentages.
Let's assume x represents the volume of the 0.9% sodium chloride solution needed in milliliters.
Since the 0.9% solution is isotonic, it means that the concentrations of tetracaine hydrochloride and sodium chloride should be equal. Therefore, the proportion can be set up as follows:
(0.9 / 100) = (2 / 100) * (x / 30)
Simplifying the proportion, we have:
0.009 = 0.02 * (x / 30)
To solve for x, we can multiply both sides of the equation by 30 and divide by 0.02:
x = (0.009 * 30) / 0.02
x ≈ 13.5 mL
Therefore, approximately 13.5 milliliters of the 0.9% sodium chloride solution should be used in compounding the prescription to make the 2% tetracaine hydrochloride solution isotonic.
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