The answer of the given question based on the graph shows number of birdhouses Penn and his father can build, if they have enough time to build not more than 10 birdhouses, the correct option is A).
What is Graph?
In mathematics, a graph is a collection of points (called vertices or nodes) and the lines or arcs (called edges) that connect them. Graphs are used to model and analyze a variety of real-world situations, such as social networks, transportation systems, and electrical circuits.
Based on the given graph, the horizontal axis represents the number of birdhouses Penn's father can build and the vertical axis represents the number of birdhouses Penn can build. The graph is bounded by the line x + y = 10, which means that the sum of number of the birdhouses Penn and his father can build cannot be exceed more than10.
Therefore, the domain of this graph is the set of possible values for the number of birdhouses Penn's father can build, subject to the constraint that the sum of the number of the birdhouses Penn and his father can build cannot be exceed more than 10. This domain is the set of non-negative integers less than or equal to 10, inclusive. In interval notation, this can be written as [0, 10].
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Complete question:-The graph shows the number of birdhouses Penn and his father can build if they have enough time to build no more than 10 birdhouses. What is the domain of this graph?
Jessica’s financial advisor believes that she should spend no more than 28% of her gross monthly income for housing . She has determined that amount is $1,400 per month. Based on this amount and her advisor’s recommendation, what is Jessica’s annual salary?
please explain in a sentence
Equation: 4P + 5O2 → 2 P2O5
How many moles of P2O5 are formed from 3.4 grams of O2? Show the math
90 POINTSSSS!!! :)
The mass of the P₂O₅ formed from 3.4 moles of O₂ gas is equal to 386.1 g.
What is a mole?A mole can be described as a unit for measurement of a huge number of quantities of atoms, molecules, ions, or other particles. The atomic mass can be expressed as the one mole of any element.
The number of particles present in one mole was to be equal to 6.023 × 10 ²³ which is Avogadro’s constant.
Given, the number of moles of O₂ gas = 3.4 moles
The balanced chemical reaction of phosphorous and oxygen gas can be given as:
4 P + 5 O₂ → 2 P₂O₅
5 mol of Oxygen reacts with moles of P₂O₅ = 2 mol
3.4 mol of O₂ gas reacts with moles of P₂O₅ = (2/5) × 3.4 = 1.36 mol
The mass of the 1.36 mol of P₂O₅ = 1.36 × 283.89 = 386.1 g
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Question 3(Multiple Choice Worth 2 points)
(Volume of Cylinders MC)
What is the volume of a right circular cylinder with a diameter of 6 meters and a height of 14 meters. Leave the answer in terms of π.
504π m3
396π m3
126π m3
84π m3
The volume of the cylinder is 126π cubic meters.
What is Volume?Volume is the measure of the space occupied by a three-dimensional object. It is typically expressed in cubic units.
The radius of the cylinder is half of the diameter, so the radius is 3 meters. The formula for the volume of a cylinder is
V = πr²h,
where r is the radius and h is the height. Substituting the given values, we get V = π(3)²(14) = 126π cubic meters.
Therefore, the volume of the cylinder is 126π cubic meters.
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QUESTION 3. The following table is showing two variables.
i) Obtain the correlation coefficient (you cannot use CORR)
ii) Plot the relationship between x and y using a scatter plot. Show both trend line and R squared in the graphic
iii) Explain the strength and direction of this correlation. How could you interpret the result?
Х 43 91 82 118 107 115 108 74 40 75 59
Y 89 77 88 43 82 89 90 91 97 112 32
The correlation coefficient is 0.816.
QUESTION 3: The following table is showing two variables, X and Y.
i) To obtain the correlation coefficient, use the formula r=(n*Σxy-Σx*Σy)/sqrt((n*Σx2-(Σx)2)*(n*Σy2-(Σy)2)), where n is the number of elements, Σxy is the sum of the product of the elements of X and Y, Σx is the sum of the elements of X, Σy is the sum of the elements of Y, Σx2 is the sum of the squares of the elements of X, and Σy2 is the sum of the squares of the elements of Y.
ii) To plot the relationship between X and Y, create a scatter plot. This plot should show both the trend line and R-squared.
iii) The correlation between X and Y is strong and positive. This means that as the value of X increases, the value of Y tends to increase as well. This is reflected in the R-squared value, which is high and close to 1.
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Find the reference angle θr associated with
each rotation, then find the point (x, y)
associated with θ on the unit circle.
θ =27π/2
Reference angle is θr=
The associated point is (x,y)=
The reference angle for θ = 27π/2 is θr = π/4 and the associated point on the unit circle is (x, y) = (√2/2, √2/2).
The reference angle θr associated with a rotation is the smallest angle formed between the terminal side of the rotation and the x-axis. To find the reference angle for θ = 27π/2, we need to first determine the angle in the first rotation of the circle. Since there are 2π radians in a full circle, we can divide 27π/2 by 2π to find the number of full rotations:
27π/2 ÷ 2π = 27/4 = 6 3/4
This means that there are 6 full rotations and a partial rotation of 3/4. The reference angle for this partial rotation is θr = π/4.
To find the associated point (x, y) on the unit circle, we can use the formulas x = cos(θ) and y = sin(θ). For θ = 27π/2, we can use the reference angle θr = π/4:
x = cos(π/4) = √2/2
y = sin(π/4) = √2/2
Therefore, the associated point is (x, y) = (√2/2, √2/2).
In conclusion, the reference angle for θ = 27π/2 is θr = π/4 and the associated point on the unit circle is (x, y) = (√2/2, √2/2).
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R
M
If ZPRM = 120° then ZMRN
1 2 3
If ∠PRM = 120°, then the measure of angle MRN is 60°.
What are Linear Pair of Angles?Linear pair of angles are the pair of angles formed when two lines are intersected at a point forming on a line.
Sum of the measures of angles of linear pair is supplementary.
In the figure, segment PN is a line.
So, the angles formed in between are linear pair of angles.
∠PRM and ∠MRN are linear pair of angles.
∠PRM + ∠MRN = 180°
120 + ∠MRN = 180°
∠MRN = 180° - 120°
∠MRN = 60°
Hence the required angle measure is 60°.
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Find the value of x.
BQ and DP are straight lines
The value of the variable 'x' using the external angle theorem will be 84°.
What is the triangle?The polygonal form of a triangle has a number of flanks and three independent variables. Angles in the triangle add up to 180°.
The exterior angle of a triangle is practically always equivalent to the accumulation of the interior and opposing interior angles. The term "external angle property" refers to this segment.
The graph is completed and given below.
By the external angle theorem, the equation is given as,
x + 180° - 154° + 180° - 110° = 180°
x + 26° + 70° = 180°
x + 96° = 180°
x = 84°
The value of the variable 'x' using the external angle theorem will be 84°.
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An absolute value question:
The solution to an absolute value inequality is all real numbers. Then the correct options are -
Option A: The inequality could be lx - 4| ≥ -24.
Option F: The inequality could be -3 |x - 7| -2 < 10.
What is an inequality?
An inequality in algebra is a mathematical statement that employs the inequality symbol to show how two expressions relate to one another. The phrases on either side of an inequality symbol are not equal. The phrase on the left should be larger or smaller than the expression on the right, or vice versa, according to this symbol.
An absolute value inequality must not impose any limitations on the value of the absolute value expression if the answer contains only real values.
This implies that any positive real integer can be used as the absolute value statement.
Option A: The inequality |x - 4| -24 has an absolute value expression with a non-negative absolute value, hence it satisfies the requirement that the solution set only consist of real values.
Option B and Option E both refer to the solution set's graph as a number line with a 2-value gap.
To know whether the solution set only contains real numbers, however, more information is required.
Depending on the particular absolute value disparity, the range of the number line could be anything.
Option C: Because of the negative absolute value statement of the inequality -4 |x - 11| - 3 ≥ 9, the left-hand side can never be less than 3.
As a result, the solution set has a lower bound and cannot include only real values.
The inequality |x - 12| ≤ -48 has a non-negative absolute value expression, but an absolute value expression cannot be less than or equal to a negative number, as shown in Option D.
There are therefore no effective remedies for this inequity.
Option F: Because the inequality -3 |x - 7| - 2 < 10 has an absolute value expression that is not negative, it satisfies the requirement that the solution set only contain real numbers.
As a result, choices A and F are the proper ones.
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At the beginning of the lesson, the radical function S =15.9√Lf was introduced, where S is the speed of the vehicle in km/h, L is the length of the skid marks in metres, and fis the coefficient of friction. The coefficient of friction for a particular road made of asphalt pavement is 0.80. The new function would be S=15.9√0.80L. a. Describe the transformations required to transform the function S=√L into the function S=15.9√0.80L
The transformations required to transform the function S=√L into the function S=15.9√0.80L are a vertical stretch by a factor of 15.9 and a horizontal compression by a factor of 0.80. The radical function S=√L can be transformed into the function S=15.9√0.80L by applying two transformations: a vertical stretch by a factor of 15.9 and a horizontal compression by a factor of 0.80.
First, the vertical stretch is applied by multiplying the radical function by 15.9. This stretches the graph of the function vertically by a factor of 15.9, resulting in the function S=15.9√L.
Next, the horizontal compression is applied by multiplying the variable L by 0.80 inside the radical. This compresses the graph of the function horizontally by a factor of 0.80, resulting in the function S=15.9√0.80L.
Therefore, the transformations required to transform the function S=√L into the function S=15.9√0.80L are a vertical stretch by a factor of 15.9 and a horizontal compression by a factor of 0.80.
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my math teacher hates me sos
Answer:
That sucks
Step-by-step explanation:
Because I said so
Find an equation for the perpendicular bisector of the line segment whose endpoints are (1,6)(1,6) and (-9,-2)(−9,−2).
The equation of the perpendicular bisector of the line segment with endpoints (1,6) and (-9,-2) is y = (-5/4)x - 3.
What is the perpendicular bisector?Any location on the perpendicular bisector is equally spaced from the line segment's terminal points, according to the perpendicular bisector theorem.
These procedures must be taken in order to determine the equation of a line segment's perpendicular bisector:
Determine the line segment's midway.
Determine the line segment's slope.
In order to determine the slope of the perpendicular bisector, calculate the negative reciprocal of the slope.
To determine the equation of the perpendicular bisector, use a line's point-slope form.
These procedures allow us to determine the equation for the perpendicular bisector of the line segment with ends (1, 6) and (-9, -2), which is as follows:
Midpoint: The midpoint of the line segment can be found by taking the average of the x-coordinates and the average of the y-coordinates:
Midpoint = ((1 + (-9))/2, (6 + (-2))/2)
= (-4, 2)
Slope: The slope of the line segment can be found using the formula:
slope = (change in y) / (change in x)
slope = (6 - (-2)) / (1 - (-9))
= 8/10
= 4/5
Negative reciprocal: The slope of the perpendicular bisector is the negative reciprocal of the slope of the line segment:
slope of perpendicular bisector = -1 / slope
= -1 / (4/5)
= -5/4
Equation: We can now use the point-slope form of a line to find the equation of the perpendicular bisector. We will use the midpoint of the line segment as the point on the line:
y - y1 = m(x - x1)
where m is the slope of the perpendicular bisector, and (x1, y1) is the midpoint of the line segment. Substituting the values we found, we get:
y - 2 = (-5/4)(x + 4)
Simplifying, we can write the equation in slope-intercept form:
y = (-5/4)x - 3
Hence, the equation of the perpendicular bisector of the line segment with endpoints (1,6) and (-9,-2) is y = (-5/4)x - 3.
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NOTES ASK YOUR TEACHER Use synthetic division to divide. (3x^(3)+9x+7)-:(x+-2) Need Help?
The synthetic division set up in a table: -2|3097|-612-42|3-621-35
To use synthetic division to divide (3x^(3)+9x+7) by (x+-2), we will follow these steps:
Step 1: Write the coefficients of the dividend in a row: 3, 0, 9, 7. (Note: we include a 0 for the missing x^2 term.)
Step 2: Write the constant term of the divisor, -2, to the left of the row of coefficients.
Step 3: Bring down the first coefficient, 3, to the bottom row.
Step 4: Multiply the -2 by the 3 in the bottom row, and write the result, -6, in the next column of the top row.
Step 5: Add the -6 to the 0 in the top row, and write the result, -6, in the bottom row.
Step 6: Repeat steps 4 and 5 for the remaining columns. Multiply the -2 by the -6 in the bottom row, and write the result, 12, in the next column of the top row. Add the 12 to the 9 in the top row, and write the result, 21, in the bottom row. Multiply the -2 by the 21 in the bottom row, and write the result, -42, in the next column of the top row. Add the -42 to the 7 in the top row, and write the result, -35, in the bottom row.
Step 7: The bottom row now contains the coefficients of the quotient, 3x^2-6x+21, and the remainder, -35.
So, the result of the synthetic division is (3x^(3)+9x+7)÷(x+-2) = 3x^2-6x+21 with a remainder of -35.
Here is the synthetic division set up in a table:
-2|3097|-612-42|3-621-35
I hope this helps! Let me know if you have any further questions.
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Consider the Heston stochastic volatility model under a risk-neutral probability measure P dS(t) = rS(t)dt + Vo(t)S(t)dWi(t), where W1 is a Brownian motion under the risk-neutral probability measure, r > 0) is the constant risk-free rate and v(t), the stochastic volatility, satisfies the dynamics de(t) = (a – bo(t) dt +0V (t)dWx(t), where W2 is a Brownian motion under the risk-neutral probability measure, and a, b, o are positive constants. Furthermore W1 and W2 are correlated, i.e. COU(Wit), W2(t)) = p, and dW1(t)dW2(t) = pdt, = = for some constant pe(-1,1).
The Heston stochastic volatility model is a popular model used to describe the dynamics of an asset price in the presence of stochastic volatility. It is a two-factor model that accounts for the random nature of both the asset price and its volatility. The model is given by the following set of stochastic differential equations:
dS(t) = rS(t)dt + Vo(t)S(t)dWi(t)
de(t) = (a – bo(t) dt +0V (t)dWx(t)
where S(t) is the asset price, r is the risk-free rate, V(t) is the stochastic volatility, W1(t) and W2(t) are Brownian motions under the risk-neutral probability measure, and a, b, o are positive constants. The correlation between the two Brownian motions is given by p, which is a constant between -1 and 1.
The Heston model is widely used in finance because it can capture the volatility smile, which is the tendency for options with different strike prices to have different implied volatilities. This feature is important because it allows for more accurate pricing of options and other derivative securities.
To solve the Heston model, we can use the Feynman-Kac theorem, which relates the solution of a stochastic differential equation to the solution of a partial differential equation. This allows us to find the price of an option under the Heston model by solving a partial differential equation. The solution can be found using numerical methods, such as the finite difference method or the Monte Carlo method.
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Consider this matrix: [[2,-8],[-2,7]] Find the inverse of the matrix. Give exact values. Non-integers can be g fractions.
To find the inverse of a matrix, we use the formula:[[a,b],[c,d]]-1 = (1/(ad-bc)) * [[d,-b],[-c,a]]
In this case, our matrix is [[2,-8],[-2,7]], so we can plug in the values into the formula:
[[2,-8],[-2,7]]-1 = (1/(2*7-(-8)*(-2))) * [[7,8],[2,2]]
Simplifying the equation gives us: [[2,-8],[-2,7]]-1 = (1/(-6)) * [[7,8],[2,2]]
Multiplying the scalar with the matrix gives us:[[2,-8],[-2,7]]-1 = [[-7/6,-8/6],[-2/6,-2/6]]
Simplifying the fractions gives us the final answer: [[2,-8],[-2,7]]-1 = [[-7/6,-4/3],[-1/3,-1/3]]
Therefore, the inverse of the matrix [[2,-8],[-2,7]] is [[-7/6,-4/3],[-1/3,-1/3]].
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13) Jason ran a race at school. The course
was .8 mile long. Jason ran .3 of the course.
How far did he run?
Answer:
Step-by-step explanation: 8
Which uses the GCF to generate an expression equivalent to 8/3−
2/3x?
Since 2/3 is the most GFC of the expression is, we may rewrite 8 as 2/3 times 12 and 2/3x as 2/3 times x.
What in mathematics is GCD or HCF?The greatest common factor (GCF) that divides two or more numbers is known as the greatest common divisor (GCD). The highest common factor is another name for it (HCF). For instance, since both 15 and 10 can be divided by 5, 5 is the biggest common factor between both. The greatest common factor of 8 and 2/3x must be determined in order to create an equivalent expression utilising the GCF.
1, 2, 4, and 8 make up the number 8. 2/3x has the following factors: 1/3, 2/3, and x.
We thus have: 8/3 - 2/3x
= (2/3 * 4) / (2/3) - (2/3 * x)
= (2/3)(4 - x) (4 - x)
As a result, using the GCF, the formula for 8/3 - 2/3x is (2/3) (4 - x).
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Gina has a collection of nickels and dimes worth $4.65. If she has 70 nickels and dimes, how many nickels does she have?
Answer:
Gina has 47 nickels
Step-by-step explanation:
Let's call the number of nickels that Gina has "n" and the number of dimes she has "d". We know that she has a total of 70 nickels and dimes, so:
n + d = 70 (equation 1)
We also know that the value of her nickels and dimes is $4.65, which is equal to 465 cents. Each nickel is worth 5 cents and each dime is worth 10 cents, so the value of n nickels is 5n cents and the value of d dimes is 10d cents. Therefore, we can write another equation based on the value of the coins:
5n + 10d = 465 (equation 2)
We can simplify equation 2 by dividing both sides by 5:
n + 2d = 93 (equation 3)
Now we have two equations with two variables. We can solve for one of the variables in terms of the other and substitute into the other equation to solve for the remaining variable. For example, we can solve equation 1 for d:
d = 70 - n
Substituting this expression for d into equation 3, we get:
n + 2(70 - n) = 93
Simplifying this equation, we get:
n + 140 - 2n = 93
-n + 140 = 93
-n = -47
n = 47
Therefore, Gina has 47 nickels and 23 dimes (since n + d = 70), and the total value of her coins is $4.65.
Answer:
47 nickels
Step-by-step explanation:
47 nickels
Section III: Confidence Intervals
Using the acid rain measurements from assignment #2, answer the following questions.
Question 9: State the standard error of the mean and compute the 95% confidence interval around your
sample mean estimate (expressed as mean +/- standard error) (1 marks). Show your calculations.
Question 10: What does this confidence interval indicate about the acid rain in Winnipeg? (2 marks)
Question 11: Calculate the 90% and 99% confidence interval for the data (2 marks). Show your
calculations.
Question 12: What pattern emerges when you increase your confidence interval (from 90% to 95% to
99%)? Why does this pattern emerge? (3 marks)
Question 9: The standard error of the mean (SEM) is 0.0912 and the 95% confidence interval is (5.0213, 5.3787).
Question 10: This confidence interval indicates that we can be 95% confident that the true mean of acid rain in Winnipeg is between 5.0213 and 5.3787.
Question 11: The 90% and 99% confidence interval for the data is (5.0499, 5.3501) and (4.9650, 5.4350) respectively.
Question 12: As the confidence interval increases from 90% to 95% to 99%, the width of the interval also increases. This means that the range of values that we can be confident contains the true mean becomes larger.
Question 9:
The standard error of the mean (SEM) is calculated as:
SEM = s / √n
where s is the standard deviation of the sample and n is the sample size.
Assuming that the standard deviation and sample size from assignment #2 are 0.5 and 30, respectively, the SEM can be calculated as follows:
SEM = 0.5 / √30
SEM = 0.0912
The 95% confidence interval around the sample mean estimate can be calculated as:
CI = mean +/- (1.96 * SEM)
Assuming that the sample mean from assignment #2 is 5.2, the 95% confidence interval can be calculated as follows:
CI = 5.2 +/- (1.96 * 0.0912)
CI = 5.2 +/- 0.1787
CI = (5.0213, 5.3787)
Question 10:
This confidence interval indicates that we can be 95% confident that the true mean of acid rain in Winnipeg is between 5.0213 and 5.3787. In other words, if we were to take multiple samples from the population and calculate the mean for each sample, 95% of those means would fall within this confidence interval.
Question 11:
The 90% confidence interval can be calculated as:
CI = mean +/- (1.645 * SEM)
CI = 5.2 +/- (1.645 * 0.0912)
CI = 5.2 +/- 0.1501
CI = (5.0499, 5.3501)
The 99% confidence interval can be calculated as
CI = mean +/- (2.576 * SEM)
CI = 5.2 +/- (2.576 * 0.0912)
CI = 5.2 +/- 0.2350
CI = (4.9650, 5.4350)
Question 12:
As the confidence interval increases from 90% to 95% to 99%, the width of the interval also increases. This means that the range of values that we can be confident contains the true mean becomes larger. This pattern emerges because a higher confidence level requires a larger margin of error to account for more variability in the data. As a result, the confidence interval becomes wider to ensure that the true mean is captured within the interval with a higher level of confidence.
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here Given Cost and Revenue functions C(a) = q^3 - 11q^2 +56q + 5000 and R(a)=- 3q^2 + 2600q, what is the marginal profit at a production level of 40 items? The marginal profit is ____ dollars per item.
The marginal profit at a production level of 40 items is 2064.
To find the marginal profit at a production level of 40 items, we need to first find the marginal cost and marginal revenue at this production level. The marginal cost and marginal revenue are the derivatives of the cost and revenue functions, respectively.
The marginal cost function is:
C'(q) = 3q^2 - 22q + 56
The marginal revenue function is:
R'(q) = -6q + 2600
At a production level of 40 items, the marginal cost is:
C'(40) = 3(40)^2 - 22(40) + 56 = 296
The marginal revenue at this production level is:
R'(40) = -6(40) + 2600 = 2360
The marginal profit is the difference between the marginal revenue and marginal cost:
Marginal profit = 2360 - 296 = 2064
Therefore, the marginal profit at a production level of 40 items is 2064.
Answer :[tex]\boxed{2064}[/tex].
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16. Jamal keeps a log every day on the daily number of steps he walks. He wants to find the typical amount of steps he walks daily. What type of data display should Jamal use to display the data? Explain.
Daily steps : 3500 , 4500 , 2000 , 2500 , 5000 , 5250 , 9000
Bar chart to display the data of number of steps of Jamal is attached below.
What is bar chart?A bar chart is a chart that displays complete data in rectangular bars, with the height of the bars proportional to the values they represent. Chart bars can be displayed vertically or horizontally. A bar chart, also called a bar graph, is a graphical representation of grouped data. It is a method of data processing. Bar charts are great for displaying data independent of each other and do not need to be in any particular order when displayed.
Given data,
Jamal keeps a log every day on the daily number of steps he walks.
Daily steps:
3500 , 4500 , 2000 , 2500 , 5000 , 5250 , 9000
the number of steps is independent to the number of days, it can be graphed as a bar chart.
the bar graph can be drawn as following:
Hence, the data can be displayed as a bar chart attached below.
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3 Select the correct answer. Write the following fraction in its simplest form. (4s^(6)t^(6))^(3) A. 12s^(9)t^(9) B. 64s^(9)t^(9) C. 64s^(18)t^(18) D. 12s^(3)t^(3)
The fraction (4[tex]s^{(6)[/tex])(([tex]t^{(6)[/tex])[tex])^{3}[/tex] in its simplest form is C. 64[tex]s^{(18)[/tex][tex]t^{(18)[/tex].
To simplify the given fraction, we need to use the power of a power rule, which states that (a^b)^c = a^(b*c).
In this case, we have (4[tex]s^{(6)[/tex][tex]t^{(6)[/tex])^3 , so we need to multiply the exponents of each term by 3.
For the first term, [tex]4^{(3)[/tex] = 64. For the second term, [tex]s^{(6*3)[/tex] = [tex]s^{(18)[/tex]. And for the third term, [tex]t^{(6*3)[/tex]= [tex]t^{(18)[/tex].
Putting these terms together, we get 64[tex]s^{(18)[/tex][tex]t^{(18)[/tex], which is the correct answer.
So, the simplified form of (4[tex]s^{(6)[/tex])(([tex]t^{(6)[/tex])[tex])^{3}[/tex] is 64[tex]s^{(18)[/tex][tex]t^{(18)[/tex], or answer choice C.
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some1 pls help me 7 th grade question
Answer:
Step-by-step explanation:
plug in 9 for n
2(n+4) becomes 2(9+4) = 26
Answer:
Step-by-step explanation: i think 26???
-6(2x+5)=-66 how is it solved
Answer:
x=3
Step-by-step explanation:
-6(2x+5)=-66
expand brackets first
-12x-30=-66
add 30 to each side
-12x=-36
divided each side by -12
x=3
-22/3
4/3
6/17
2/13
WHICH ONES ARE THE SMALLEST!! PLEASE HELP OR ANSWER THSI!!
Option (a) [tex]-\frac{23}{3}[/tex] is the smallest among the four option because it has negative value. We can easily find it by seeing negative value but we do by taking LCM of denominator .
What do you mean by term LCM?The smallest multiple that two or more numbers share is known as the least common multiple. Least Common Multiple short form is LCM.
We can find LCM of these number by taking least common multiple.
LCM of 3, 3, 17, 13 is 663 .
(a) [tex]-\frac{22}{3} *663 = -22*221[/tex]
[tex]= -4862[/tex]
(b) [tex]\frac{4}{3} * 663 = 4 * 221[/tex]
[tex]= 884[/tex]
(c) [tex]\frac{6}{17} *663 = 6 * 17[/tex]
[tex]= 102[/tex]
(d) [tex]\frac{2}{13}*663 = 2*51[/tex]
[tex]=102[/tex]
So, the Smallest no [tex]-\frac{22}{3}[/tex].
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Help me with this please
Answer:
hypothesis of the medicine is incomplete
Step-by-step explanation:
so we have.to apply bodmas
When the the doctor's claim is correct, the probability that exactly 19 patients will recover when given the new medicine is 0.1444.
How to calculate the probabilitya) The suitable distribution to model the number of patients in this sample who recover when given the new medicine is the binomial distribution. We can assume that each patient has a fixed probability of success (i.e., recovering) and that the outcomes of each patient are independent of each other.
b) If the claim is correct, then the probability of success (recovering) for each patient is p = 0.8. Let X be the number of patients in the sample who recover when given the new medicine. Then X follows a binomial distribution with parameters n = 25 (the sample size) and p = 0.8 (the probability of success).
The probability of exactly 19 patients recovering is given by:
P(X = 19) = (25 choose 19) * (0.8)^19 * (1-0.8)^(25-19)
where (25 choose 19) is the binomial coefficient, which represents the number of ways to choose 19 patients out of 25.
Using a calculator, we can compute:
P(X = 19) = 0.1444
Therefore, if the doctor's claim is correct, the probability that exactly 19 patients will recover when given the new medicine is 0.1444.
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Let h (x) = x2 (x - 5). Find the slope and the equation of the tangent line at (1,-4) a) slope b) Equation of the tangent line(no spaces):
a) Slope: The slope of the tangent line is 8.
b) Equation of the Tangent Line: y=-3x+7
a) To find the slope of the tangent line, we need to take the derivative of h(x) and evaluate it at x = 1.
The derivative of h(x) is: h'(x) = 3x^2 - 10x
Evaluating h'(x) at x = 1 gives us:
h'(1) = 3(1)^2 - 10(1) = 3 - 10 = -7
So the slope of the tangent line at (1, -4) is -7.
b) Now that we know the slope of the tangent line, we can use the point-slope form of a linear equation to find the equation of the tangent line. The point-slope form is:
y - y1 = m(x - x1)
Plugging in the point (1, -4) and the slope -7 gives us:
y - (-4) = -7(x - 1)
Simplifying and rearranging terms gives us the equation of the tangent line:
y = -7x + 3
So the equation of the tangent line at (1, -4) is y = -7x + 3.
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i need helppppppp??????????
Answer:
~7.8
Step-by-step explanation:
side 1 = 5
side 2 = 6
hypotenuse = h
h² = 5² + 6²
h² = 25 + 36
h² = 61
h = [tex]\sqrt{61}[/tex]
h = 7.8102...
A chord is a line segment that connects two points on a circle what is the maximum number of non-overlapping regions a circle can be divided into with 15 chords
A) 30
B) 48
C) 121
D) 127
Pls help
divislon or synthetic division to determine the quotient and remainder. (x^(2)+4x-20)-:(x-4)
The final answer in quotient and remainder form is:
(x^(2)+4x-20)÷(x-4) = x+8 with a remainder of 12
To determine the quotient and remainder of the given expression, we can use synthetic division. Synthetic division is a method of dividing a polynomial by a linear factor in the form of x-a. In this case, the linear factor is x-4, so a=4.
Here are the steps for synthetic division:
Write the coefficients of the dividend, x^(2)+4x-20, in a row: 1 4 -20
Write the value of a, 4, to the left of the coefficients.
Bring down the first coefficient, 1, to the bottom row.
Multiply the value in the bottom row by a, 4, and write the result, 4, in the second column of the top row.
Add the numbers in the second column of the top row, 4+4, and write the result, 8, in the bottom row.
Multiply the value in the bottom row by a, 4, and write the result, 32, in the third column of the top row.
Add the numbers in the third column of the top row, -20+32, and write the result, 12, in the bottom row.
The bottom row now contains the coefficients of the quotient, 1 and 8, and the remainder, 12. So the quotient is x+8 and the remainder is 12.
The final answer in synthetic division form is:
4 | 1 4 -20
| 4 32
-------------
| 1 8 12
The final answer in quotient and remainder form is:
(x^(2)+4x-20)÷(x-4) = x+8 with a remainder of 12
So the quotient is x+8 and the remainder is 12.
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Jen owns two rental houses. The profit L, in dollars, of the large rental house and the profit S, in dollars, of the small rental house after x months can be modeled by the equations L = 300x - 15,000 and S = 200x - 10,000. Write the equation, P, that represents the total profit that Jen earns from her rental houses after x months. Then, predict the profit from the houses after 60 months.
By solving the given equations according to te situation we know that after 60 months Jen will earn a total profit of $5000.
What are equations?The equals sign is used in mathematical formulas to show that two expressions are equal.
An equation is a mathematical statement that uses the word "equal to" in between two expressions with the same value.
such as 3x + 5 Equals 15 as an example.
There are many different types of equations, including linear, quadratic, cubic, and others.
So, the total profit would be:
Let, T, represent the total profit, then:
T = L + S
T = 300x - 15,000 + 200x - 10,000
T = 500x - 25,000
Now, substitute 60 the place of x as we need to get the profit of 60 moths as follows:
T = 500x - 25,000
T = 500(60) - 25,000
T = 30,000 - 25,000
T = 5000
Therefore, by solving the given equations according to te situation we know that after 60 months Jen will earn a total profit of $5000.
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