The side of a triangle with 3 equal sides is 8 inches shorter than the side of a square. The perimeter of the square is 46 inches more than the perimeter of the triangle. Find the length of a side of the square.

Answer:

The surface area of a cone of radius r and height h not equal​ to one-third the surface area of a cylinder with the same radius and​ height.

Relationship is [tex]S_c=(\frac{\sqrt{(r+h)}}{2h})S_C[/tex]

Step-by-step explanation:

Given : The volume of a cone of radius r and height h is​ one-third the volume of a cylinder with the same radius and height.

To find : Does the surface area of a cone of radius r and height h equal​ one-third the surface area of a cylinder with the same radius and​ height?

If​ not, find the correct relationship. Exclude the bases of the cone and cylinder.

Solution :

Radius of cone and cylinder is 'r'.

Height of cone and cylinder is 'h'.

The volume of cone is [tex]V_c=\frac{1}{3}\pi r^2 h[/tex]

The volume of cylinder is [tex]V_C=\pi r^2 h[/tex]

[tex]\frac{V_c}{V_C}=\frac{\frac{1}{3}\pi r^2 h}{\pi r^2 h}[/tex]

[tex]V_c=\frac{1}{3}V_C[/tex]

i.e. volume of cone is one-third of the volume of cylinder.

Now,

Surface area of the cone is [tex]S_c=\pi r\sqrt{(r+h)}[/tex]

Surface area of the cylinder is [tex]S_C=2\pi rh[/tex]

Dividing both the equations,

[tex]\frac{S_c}{S_C}=\frac{\pi r\sqrt{(r+h)}}{2\pi rh}[/tex]

[tex]\frac{S_c}{S_C}=\frac{\sqrt{(r+h)}}{2h}[/tex]

[tex]S_c=(\frac{\sqrt{(r+h)}}{2h})S_C[/tex]

Which clearly means [tex]S_c\neq \frac{1}{3}S_C[/tex]

i.e. The surface area of a cone of radius r and height h not equal​ to one-third the surface area of a cylinder with the same radius and​ height.

The relationship between them is

[tex]S_c=(\frac{\sqrt{(r+h)}}{2h})S_C[/tex]

Answer:

(44)₁₆

Step-by-step explanation:

to convert it into hexa decimal we have select four pair of binary digit

(1000100)₂→(?)₁₆

  100  0100

to solve this we have to no the decimal conversion of

0100 which is '4'

so,

conversion of (1000100)₂→(44)₁₆

Answer:

g(2y) = 8y^2 -3

Step-by-step explanation:

g(x)=2 x^2   -3

Let x=2y

g(2y) = 2 (2y)^2 -3

         = 2 (4y^2)  -3

         = 8y^2 -3

Answer:

Simplest function is f(x) = 2x - 1

Step-by-step explanation:

When a function has a zero, simply put, that point is where the graph goes through the x-axis.  At this point, the y value is 0.

If a function has a 0 of 1/2, that translates to x = 1/2 and also (1/2, 0).  That means that y = 0 when x = 1/2.

If x = 1/2 and is a zero, then x - 1/2 = 0 and 2x - 1 = 0 (notice that y = 0 here and solving for x would get you right back to x = 1/2).

The simplest function with a zero of 1/2 is

f(x) = 2x - 1

You know it is true that the zero is 1/2 for two reasons.  First one is to set the right side equal to 0 and solve for x.

The second one is to graph the line y = 2x - 1 and see that it goes through the x axis at 1/2 where y = 0.

Answer:

[tex] y=\frac{C}{x}[/tex].

Step-by-step explanation:

Given homogeneous equation

[tex] x^2ydy+xy^2dx=0[/tex]

[tex]\frac{\mathrm{d}y}{\mathrm{d}x}=-\frac{xy^2}{x^2y}[/tex]

Substitute y=ux , [tex]u=\frac{y}{x}[/tex]

[tex] \frac{\mathrm{d}y}{\mathrm{d}x}=-\frac{y}{x}[/tex]

Now,

[tex]u+x\frac{\mathrm{d}u}{\mathrm{d}x}=\frac{\mathrm{d}y}{\mathrm{d}x}[/tex]

[tex]u+x\frac{\mathrm{d}u}{\mathrm{d}x}=-u[/tex]

[tex]\frac{\mathrm{d}u}{\mathrm{d}x}=-2u[/tex]

[tex]\frac{du}{u}=-\frac{dx}{x}[/tex]

Integrating both side we get

lnu=-2lnx+lnC

Where lnC= integration constant

[tex]lnu+ln{x}^2=lnC[/tex]

[tex]lnux^2=lnC[/tex]

Cancel ln on both side

[tex]ux^2=C[/tex]

Substitute [tex]u=\frac{y}{x}[/tex]

Then we get

xy=C

[tex]y=\frac{C}{x}[/tex].

Answer:[tex]y=\frac{C}{x}[/tex].

First solve the congruence [tex]13y\equiv1\pmod{330}[/tex]. Euclid's algorithm shows

330 = 25 * 13 + 5

13 = 2 * 5 + 3

5 = 1 * 3 + 2

3 = 1 * 2 + 1

=> 1 = 127 * 13 - 5 * 330

=> 127 * 13 = 1 mod 330

so that [tex]y=127[/tex] is the inverse of 13 modulo 330. Then in the original congruence, multiplying both sides by 127 twice gives

[tex]127^2\cdot13^2x\equiv127^2\cdot5^2\pmod{330}\implies x\equiv127^2\cdot5^2\equiv403,225\equiv295\pmod{330}[/tex]

Then any integer of the form [tex]x=295+330n[/tex] is a solution to the congruence, where [tex]n[/tex] is any integer.

Final answer:

Using the Chinese Remainder Theorem, the final solution to the congruence is x = 9 + 330k, where k is an integer.

Explanation:

To solve the congruence 169x ≡ 25 (mod 330), we can use the Chinese Remainder Theorem. First, we factor 330 into its prime factors: 330 = 2 × 3 × 5 × 11. Next, we solve the congruences 169x ≡ 25 (mod 2), 169x ≡ 25 (mod 3), 169x ≡ 25 (mod 5), and 169x ≡ 25 (mod 11) separately.

For the congruence 169x ≡ 25 (mod 2), since 169 ≢ 1 (mod 2), we can ignore it. For the congruence 169x ≡ 25 (mod 3), we can rewrite it as x ≡ 1 (mod 3). For the congruence 169x ≡ 25 (mod 5), we can rewrite it as 4x ≡ 0 (mod 5), and since gcd(5, 4) = 1, we can divide both sides by 4 to get x ≡ 0 (mod 5). Lastly, for the congruence 169x ≡ 25 (mod 11), we can rewrite it as 5x ≡ 3 (mod 11), and solve for x which will give us x ≡ 9 (mod 11).

Using the Chinese Remainder Theorem, we can combine these solutions to get x ≡ 9 (mod 330). Therefore, the solution to the congruence is x = 9 + 330k, where k is an integer.

The answer is:

The only value of "x" that IS NOT in the domain of the function h,  is -3.

Since we are working with a quotient (or division), we must remember that the only restriction for this kind of functions are the values that make the denominator equal to 0, so, the domain of the function will include all the values of "x" that are different than the zeroes or roots of the denominator.

We have the function:

[tex]h(x)=\frac{x^2-5x-24}{x^2+6x+9}[/tex]

Where its denominator is :

[tex]x^2+6x+9[/tex]

Now, finding the roots or zeroes of the expression, by factoring, we have:

We need to find two numbers which product is equal to 9 and its addition is equal to 6, that number will be the same for both conditions (3):

[tex]3*3=9\\3+3=6[/tex]

So, the factorized form of the expression will be:

[tex](x+3)^2[/tex]

We have that the expression will be equal to 0 if "x" is equal to "-3", so, the only value of x that IS NOT in the domain of the function h,  is -3.

Hence, the domain will be:

Domain: (-∞,-3)U(-3,∞)

Have a nice day!

Final answer:

The only value that is not in the domain of the function h(x) is x = -3, since it makes the denominator of the function equal to zero, thus making the function undefined.

Explanation:

To determine the values that are not in the domain of the function h(x) = x² - 5x - 24}{x² + 6x +9}, we need to identify any values of x that would make the denominator equal to zero, since division by zero is undefined. To do this, we will factor the denominator and find its roots.

First, let's factor the denominator:

x² +6x + 9 = (x + 3)(x + 3)

Now, we set the factored denominator equal to zero to find the values of x that are not in the domain:

(x + 3)(x + 3) = 0

This equation has one distinct root, x = -3.

Therefore, the only value that is not in the domain of h is x = -3. If you substitute x = -3 into the original function, the denominator becomes zero, and the function is undefined.

Answer:

No solution. Inconsistent.

Step-by-step explanation:

The equations are

[tex]2x+4y\leq 16\\x\leq 5\\y\leq 2\\x=6[/tex]

As we can see here that x=6 and x<=5 the solution area will not be bounded i.e., there will be no common area.

The lines do not intersect

Therefore there will be no solution.

Plotting the equations we get the graph below.

A strategy to avoid the question would be by just looking at the linear equations. It can be clearly seen that there are two lines that will never intersect and hence will have no solution.

Answer:

see attachment

Step-by-step explanation:

The nurse will set the infusion of oxytocin at approximately 117 mL/hr.

To calculate the rate at which the nurse will set the infusion of oxytocin, we can use the formula:

Rate (mL/hr) = (Order dose × Volume ÷ Time)

Substituting the given values:

After calculating, we find that the nurse will set the infusion at approximately 117 mL/hr.

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Answer: There are 676 three-letter strings that begin with J .

Step-by-step explanation:

The number of letters in  English Alphabet = 26

If first letter is fixed as J , then the number of ways to make 3 letters strings [repetition is allowed ] is given by :-

[tex]1\times26\times26=676[/tex]

(The first place is occupied by J and the rest of the two place has 26 ways of getting any letter)

Now, there are 676 three-letter strings that begin with J .

The first and second derivatives of the given functions can be found using the chain rule of differentiation. The slope of the curve can be determined using these derivatives and to find out where the curve is concave upwards, the second derivative should be greater than zero.

To find the first and second derivatives dy/dx and d2y/dx2, we first need to use the chain rule. The chain rule states that the derivative of a composite function is the derivative of the outside function multiplied by the derivative of the inside function.

For dy/dx = dy/dt * dt/dx. Since y = cos(t), dy/dt = -sin(t). And since x = cos(2t), dx/dt = -2sin(2t). Thus, dy/dx = [-sin(t)] / [-2sin(2t)].Now, let's find d2y/dx2 which is the derivative of dy/dx with respect to x. So, d2y/dx2 = d/dx (dy/dx). Here, please use the quotient rule and chain rule again for differentiation.

For a curve to be concave upward, the second derivative needs to be greater than zero. So, you need to set your second derivative function greater than zero and solve for t within the given interval 0 < t < π.

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The first derivative is  [tex]\frac{dy}{dx} =\frac{1}{2cos(t)}[/tex] , and the second derivative is [tex]\frac{d^2y}{dx^2} = \frac{-1}{4cos^2tsin(2t)}[/tex]. The curve is concave upward in the interval (0, π/2).

We begin by finding the derivatives of x and y with respect to t.

Given x = cos(2t), differentiate to get:

[tex]\frac{dx}{dt} = -2sin(2t)[/tex]

Given y = cos(t), differentiate to get:

[tex]\frac{dy}{dt} = -sin(t)[/tex]

Using the chain rule,

[tex]\frac{dy}{dx} =\frac{dy}{dt} \frac{dt}{dx} = -sin(t) \cdot \frac{(-1)}{2sin(2t)} = \frac{1}{2cos(t)}[/tex]

Next, we need to find d²y/dx².

Start by finding the derivative of dy/dx with respect to t:

Given, [tex]\frac{dy}{dx} =\frac{1}{2cos(t)}[/tex] differentiate to get:

[tex]\frac{d(\frac{dy}{dx}) }{dt} = \frac{sin(t)}{2cos^2t}[/tex]

Using the chain rule again:

[tex]\frac{d^2y}{dx^2}= \frac{\frac{d(\frac{dy}{dx})}{dt} }{\frac{dx}{dt}} = \frac{-1}{4cos^2tsin(2t)}[/tex]

To determine where the curve is concave upward, we need d²y/dx² > 0.

Since sin(2t) is periodic, we look for values of t where sin(2t) is positive.

This is true for the interval (0, π/2). Thus, the curve is concave upward in the interval (0, π/2).

Answer:

Step-by-step explanation:

Answer:

The absolute minimum value of the function over the​ interval [0,7] is -18.

Step-by-step explanation:

The given function is

[tex]f(x)=x^2-6x-9[/tex]

Differentiate f(x) with respect to x.

[tex]f'(x)=2x-6[/tex]

Equate f'(x)=0  to find the critical points.

[tex]2x-6=0[/tex]

[tex]2x=6[/tex]

[tex]x=3[/tex]

The critical point is x=3.

Differentiate f'(x) with respect to x.

[tex]f''(x)=2[/tex]

Since f''(x)>0 for all values of x, therefore the critical point is the point of minima and the function has no absolute maximum value.

3 ∈ [0,7]

Substitute x=3 in the given function to find the absolute minimum value.

[tex]f(3)=(3)^2-6(3)-9[/tex]

[tex]f(3)=9-18-9[/tex]

[tex]f(3)=-18[/tex]

Therefore the absolute minimum value of the function over the​ interval [0,7] is -18.

The maximum value of the function f(x) = x² - 6x - 9 over the interval [0, 7] is 2, which occurs at x = 7, and the minimum value is -9, which occurs at both x = 0 and x = 3.

The function given is f(x) = x² - 6x - 9. To find the maximum and minimum values of this function over the interval [0, 7], we first need to find the critical points of the function. These occur where the derivative of the function is zero or undefined. The derivative of f(x) is f'(x) = 2x - 6. Setting this equal to zero and solving for x gives x = 3. Since this value is within our interval, it is a critical point of the function.

Next, we evaluate the function at the endpoints of the interval and at our critical point. We have f(0) = -9, f(3) = -9, and f(7) = 2. This shows that the maximum value of the function over the interval is 2, which occurs at x = 7, and the minimum value is -9, which occurs at both x = 0 and x = 3.

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Answer:

Step-by-step explanation:

Given data

principal P = $10000

rate (r) = 6.5%

to find out

amount in account and the interest earned after one year, five, years, ten years, and 20 years

solution

we know the formula for compounds interest continuously i.e.

amount = principal [tex]e^{rt}[/tex]     ..............1

and

compounds interest annually i.e.

amount = principal [tex](1+r/100)^{t}[/tex]  ..................2

here put value principal rate and time period 1, 5 10 and 20 years

and we get the  amount for each time period        

than for interest = amount - principal we get interest    

as that we calculate all value

i put all value in table here

Final answer:

To calculate the future value of two accounts both starting with $10,000 at a 6.5% interest rate, one compounding annually and the other continuously, we use the formulas for annual and continuous compounding to compare the total amount and interest earned over 1, 5, 10, and 20 years. The continuous compounding results in higher amounts as shown in the provided table.

Explanation:

To compare the growth of two accounts with an initial deposit of $10,000 at an annual interest rate of 6.5%, with one account compounding annually and the other compounding continuously, we can use the following formulas:

Where:
A = the amount of money accumulated after n years, including interest.
P = the principal amount (the initial amount of money).
r = the annual interest rate (in decimal form).
n = the number of times that interest is compounded per year.
t = the time in years.
e = the base of the natural logarithm, approximately equal to 2.71828.

To make the calculations for both accounts after 1, 5, 10 and 20 years, we will round all values to the nearest dollar and not include dollar signs as per the student's request.

Annual Compounding

Here, n is 1 since interest compounds once per year.

Continuous Compounding

Using the formula for continuous compounding, we do not need a value for n.

Let's look at the calculations:

TimeAnnual Compounded AmountContinuous Compounded AmountInterest Earned (Annual)Interest Earned (Continuous)1 year$10,695$10,709$695$7095 years$13,612$13,747$3,612$3,74710 years$18,504$18,907$8,504$8,90720 years$34,262$35,861$24,262$25,861

From the table, we can conclude that continuous compounding results in a higher total amount and interest earned over time compared to annual compounding for the same interest rate.

Answer:

$3316 should be invested.

Step-by-step explanation:

Since, the amount formula in compound interest is,

[tex]A=P(1+r)^t[/tex]

Where, P is the principal amount,

r is the rate per period,

t is the time in years,

Here,

A = $ 60,000,

r = 10.5% = 0.105

t = 29 years,

By substituting value,

[tex]60000=P(1+0.105)^{29}[/tex]

[tex]P=\frac{60000}{1.105^{29}}=\$3316.23415377\approx \$3316[/tex]

Hence, $ 3316 should be invested.

Answer:

Is correct.

Step-by-step explanation:

If you don't write the n and t in the left part of the set (before the : ) we assume that are fixed.

(t, infinity) = {[tex]x \in \mathbb{R} : t<x<\infty, t\in \mathbb{R}[/tex]}

(0,1/n) =  {[tex]x \in \mathbb{R} : 0<x<\frac{1}{n}, n\in \mathbb{N}[/tex]}

Explained the mean, median, and standard deviation for a sample of CFOs' salaries in the electronics industry.

Mean: To find the mean, you add up all the salaries and divide by the number of salaries. For the CFOs, the mean salary is $544,773.

Median: To find the median, you arrange the salaries in order and find the middle value. For the CFOs, the median salary is $546,000.

Standard Deviation: The standard deviation measures the dispersion of data. For the CFOs, you can calculate it using the given formula to be approximately $29,534.

Answer:

27 degrees

Step-by-step explanation:

The standard deviation means it can be up or down by that many degrees. The temperatures can be between 20-28 degrees. 27 degrees is the only option in this set of numbers.

Answer:

your answer is C 27

Step-by-step explanation:

Answer:

a. A hypothesis test is better

b. confidence interval​ method; and critical value​ method will lead to the same conclusion

Step-by-step explanation:

a. A hypothesis test is better

b. confidence interval​ method; and critical value​ method will lead to the same conclusion

when samples are taken from a population, the mean values of these samples are approximately normally distributed,that is, the mean values forming the sampling distribution of means is approximately normally distributed. It is also true that if the standard deviations of each of the samples is found, then the standard deviations of all the samples are approximately normally distributed, that is, the standard deviations of the sampling distribution of standard deviations are approximately normally distributed.

Parameters such as the mean or the standard deviation of a sampling distribution are called sampling statistics, S.

Final answer:

When comparing two population proportions, a hypothesis test is favored at a 0.01 significance level. The confidence interval and P-value methods are equivalent when assuming equal population proportions.

Explanation:

Hypothesis Test vs. Confidence Interval:

When dealing with inferences for two population proportions, a hypothesis test is better to test the claim that one proportion is less than the other at a 0.01 significance level.

Equivalence of Methods in Statistic Testing:

The confidence interval method and the P-value method are equivalent in that they both rely on assumed equal population proportions to draw conclusions.

Answer:

Total deposit in each month is $ 932.84

Step-by-step explanation:

Step 1:  Monthly interest rate.

Monthly Rate = (1+annual rate)112−1

we have  Annual rate = 3.5%

Monthly Rate = (1+0.035)112−1 = 0.0028709

Step 2:  monthly payment

Monthly payment can be determined by using below formula:

A=P×i×1−(1+i)−n

A = monthly payment amount

P = total pay amount

i = monthly interest rate

n = total number of payments

In this example we have

P=$150000 ,

i=0.0028709  and

n=12×18=216

Monthly payment = P×i×1−(1+i)−n

= 150000×0.00287091−(1+0.0028709)−216 = 430.6351−(1.0028709)−216

Monthly payment  =$ 932.84

To have $150,000 in 18 years with a 3.5% APR compounded monthly, you need to deposit approximately $499.58 each month. The formula for the future value of an annuity and the power of compound interest are key to understanding how regular savings can grow over time.

To determine how much you have to deposit each month to have $150,000 in 18 years with an account paying 3.5% APR, you'll need to use the formula for the future value of an annuity. The future value of an annuity formula is:

Future Value = [tex]Pmt * ((1 + r/n)^{(nt)} - 1) / (r/n)[/tex]

where:

Pmt = monthly payment

r = annual interest rate (decimal)

n = number of times the interest is compounded per year

t = number of years.

First, convert the APR to a monthly interest rate by dividing by 12, since there are 12 months in a year. The monthly interest rate is 0.035 / 12. The interest is compounded monthly, so n is 12. Let's solve for Pmt (monthly deposit) using the formula:

[tex]150,000 = Pmt * ((1 + 0.035/12)^{(12*18)} - 1) / (0.035/12)[/tex]

By using a financial calculator or algebra, you can find the monthly deposit required:

Pmt ≈ $499.58

Therefore, you would need to deposit approximately $499.58 each month into your savings account to have $150,000 in 18 years.

It's important to start saving money early and to let the power of compound interest work in your favor, as seen in the provided examples where initial investments grow significantly over time due to compound interest.

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Answer:

The future value = $1780

Step-by-step explanation:

* Lets explain the formula of the future value

- Future Value of an annuity is used to determine the future value of a

 stream of equal payments.

- The future value of an annuity formula can also be used to determine

  the number of payments, the interest rate, and the amount of the

  recurring payments

- The future value formula is [tex]FV=\frac{PMT}{i}(1-\frac{1}{(1+i)^{n}})[/tex]

 where:

# FV = Future Value of the annuity

# PMT= Payment amount  

# i = Annual interest rate  

# n = Number of payments

* Lets solve the problem

- n = 27

- i = 0.04

- PMT = $109

- To find FV lets use the formula above

∵ n = 27 , i = 0.04 , PMT = 109

∴ [tex]FV=\frac{109}{0.04}(1-\frac{1}{(1+0.04)^{27}})[/tex]

∴ [tex]FV=2725(1-\frac{1}{(1.04)^{27}})=1779.9248[/tex]

∴ FV = 1779.92 ≅ 1780

∴ The future value = $1780

The future value is calculated using the formula FV = PMT * [(1+i)^n - 1] / i. With a regular payment of $109, an interest rate of 0.04, and 27 periods, you can compute the future value.

The future value (FV) of an annuity can be calculated using the formula: FV = PMT * [(1+i)^n - 1] / i, where PMT is the regular payment, i is the interest rate, and n is the number of periods. In this case, the interest rate (i) is 0.04, the number of periods (n) is 27, and the regular payment (PMT) is $109. Plugging these values into the formula, we get FV = $109 * [(1+0.04)^27 -1] / 0.04. After performing these computations, you can find the future value (FV).

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Answer:

a. 13%

b. 20%

c. 2%

Step-by-step explanation:

The best way to solve this problem is by drawing a Venn diagram.  Draw a rectangle representing all the fourth-graders.  Draw two overlapping circles inside the rectangle.  Let one circle represent proficiency in reading.  This circle is 85% of the total area (including the overlap).  And let the other circle represent proficiency in math.  This circle is 78% of the total area (including the overlap).  The overlap is 65% of the total area.

a. Since the overlap is 65%, and 78% are proficient in math, then the percent of all students who are proficient in math but not reading is the difference:

78% − 65% = 13%

b. Since the overlap is 65%, and 85% are proficient in reading, then the percent of all students who are proficient in reading but not math is the difference:

85% − 65% = 20%

c. The percent of students not proficient in reading or math is 100% minus the percent proficient in only reading minus the percent proficient in only math minus the percent proficient in both.

100% − 20% − 13% − 65% = 2%

See attached illustration (not to scale).

The probability of a student being proficient in mathematics but not in reading is 13%, in reading but not in mathematics is 20%, and in neither reading nor mathematics is 2%.

To solve the student's query, we'll use the principle that the probability of an event is the number of favorable outcomes divided by the total number of outcomes. We can apply the addition rule for probabilities, which states that the probability of either of two mutually exclusive events occurring is the sum of their individual probabilities, minus the probability of both events happening.

Let P(M) be the probability the student is proficient in mathematics, P(R) be the probability the student is proficient in reading, and P(M & R) be the probability the student is proficient in both. The question asks for P(M) - P(M & R), the probability of being proficient in mathematics but not in reading. That is 78% - 65% = 13%.

Similarly, the probability of a student being proficient in reading but not mathematics is P(R) - P(M & R), which equals 85% - 65% = 20%.

To find the probability of a student being proficient in neither subject, we can find the probability of a student being proficient in at least one subject and then subtracting this from 100%. The probability of being proficient in at least one subject is P(R) + P(M) - P(M & R), or 85% + 78% - 65% = 98%. Thus, the probability of being proficient in neither is 100% - 98% = 2%.

Step-by-step explanation:

Let's take "a" an element from A, a ⊆ A.

As A ⊆ B, a ⊆ A ⊆ B, so a ⊆ B.

Therefore, a ⊆ B ⊆ Cc, a ⊆ Cc.

Let's remember that Cc is exactly the opposite of C. That means that an element is in C or in Cc; it has to be in one of them but not in both.

As a ⊆ Cc, a ⊄ C.

As we can generalize this for every element of A, there is not element of A that is contained in C.  

Therefore, the intersection (the elements that are in both A and C) is empty.

Answer:

a) Confidence interval is (182.86,203.54).

b) (i) Yes, 200 bips is a true mean as it lie in the interval.

(ii) No, 210 bips is not a true mean as it doesn't lie in the interval.

Step-by-step explanation:

Given : A researcher studied the radioactivity of asbestos. She sampled 81 boards of asbestos, and found a sample mean of 193.2 bips, and a sample standard deviation of 49.5 bips.

To find : (a) Obtain the 94% confidence interval for the mean radioactivity. (b) (i) According the interval that you got, is 200 bips a plausible value for the true mean? (ii) What about 210 bips?

Solution :

a) The confidence interval formula is given by,

[tex]\bar{x}-z\times \frac{\sigma}{\sqrt{n}} <C.I<\bar{x}+z\times \frac{\sigma}{\sqrt{n}}[/tex]

We have given,            

The sample mean [tex]\bar{x}=193.2[/tex] bips

s is the standard deviation [tex]\sigma=49.5[/tex] bips

n is the number of sample n=81

z is the score value, at 94% z=1.88

Substitute all the values in the formula,

[tex]193.2-1.88\times \frac{49.5}{\sqrt{81}} <C.I<193.2+1.88\times \frac{49.5}{\sqrt{81}}[/tex]

[tex]193.2-1.88\times 5.5 <C.I<193.2+1.88\times 5.5[/tex]

[tex]193.2-10.34 <C.I<193.2+10.34[/tex]

[tex]182.86 <C.I<203.54[/tex]

Confidence interval is (182.86,203.54).    

b) (i) According the interval [tex]182.86 <C.I<203.54[/tex]

200 bips a plausible value for the true mean as it lies in the interval.

(ii) 210 bips not lie in the confidence interval so it is not a true mean.

To obtain the 94% confidence interval for the mean radioactivity, use the formula: CI = X ± (Z * σ / √n). The 94% confidence interval for the mean radioactivity is (181.05, 205.35). To determine if a value is plausible, check if it falls within the confidence interval.

To obtain the 94% confidence interval for the mean radioactivity, we'll use the formula:

CI = X ± (Z * σ / √n)

Where X is the sample mean, Z is the z-score corresponding to the desired confidence level, σ is the sample standard deviation, and n is the sample size.

For a 94% confidence level, the z-score is approximately 1.88. Plugging in the values:

CI = 193.2 ± (1.88 * 49.5 / √81) = 193.2 ± 12.15

The 94% confidence interval for the mean radioactivity is (181.05, 205.35).

(b) (i) To determine if 200 bips is a plausible value, we check if it falls within the confidence interval. Since 200 is within the interval (181.05, 205.35), it is a plausible value. (ii) Similarly, we check if 210 bips falls within the interval. Since 210 is not within the interval, it is not a plausible value.

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Answer:

The he cosine of the angle between the planes is [tex]\frac{14}{11\sqrt{6}}[/tex].

Step-by-step explanation:

Using the definition of the dot product:

[tex]\cos\theta =\frac{\overrightarrow{a}\cdot \overrightarrow{b}}{|\overrightarrow{a}||\overrightarrow{b}|}[/tex]

The given planes are

[tex]-1x+3y+1z=0[/tex]

[tex]5x+5y+4z=-4[/tex]

The angle between two normal vectors of the planes is the same as one of

the angles between the planes. We can find a normal vector to each of the

planes by looking at the coefficients of x, y, z.

[tex]\overrightarrow{n_1}=<-1,3,1>[/tex]

[tex]\overrightarrow{n_2}=<5,5,4>[/tex]

[tex]\overrightarrow{n_1}\cdot \overrightarrow{n_2}=(-1)(5)+(3)(5)+(1)(4)=14[/tex]

[tex]|n_1|=\sqrt{(-1)^2+(3)^2+(1)^2}=\sqrt{11}[/tex]

[tex]|n_2|=\sqrt{(5)^2+(5)^2+(4)^2}=\sqrt{66}[/tex]

The cosine of the angle between the planes

[tex]\cos\theta =\frac{\overrightarrow{n_1}\cdot \overrightarrow{n_2}}{|\overrightarrow{n_1}||\overrightarrow{n_2}|}[/tex]

[tex]\cos\theta =\frac{14}{\sqrt{11}\sqrt{66}}[/tex]

[tex]\cos\theta =\frac{14}{11\sqrt{6}}[/tex]

Therefore the cosine of the angle between the planes is [tex]\frac{14}{11\sqrt{6}}[/tex].

To find the cosine of the angle between two planes, calculate the dot product of their normal vectors.

To find the cosine of the angle between two planes, we need to determine the normal vectors of the planes and then calculate the dot product of the two normal vectors. The dot product of two vectors is equal to the product of their magnitudes and the cosine of the angle between them.

Given the planes -x+3y+z=0 and 5x+5y+4z=-4, the normal vectors are (-1,3,1) and (5,5,4) respectively.

Calculating the dot product of the two normal vectors, we get: (-1)(5) + (3)(5) + (1)(4) = 0. Therefore, the cosine of the angle between the planes is 0.

Answer:

44.72 Vanilla

24.08 Chocolate

Step-by-step explanation:

26% of 172 choose vanilla

14% of 172 choose chocolate

Answer: second option.

Step-by-step explanation:

By definition, the measure of any interior angle of an equilateral triangle is 60 degrees.

Based in this, we know that the measusre of the angle ∠SRT is:

[tex]\angle SRT=\frac{60\°}{2}=30\°[/tex]

The, we can find the value of "y":

[tex]y+12=30\\y=30-12\\y=18[/tex]

To find the value of "x", we must use this identity:

[tex]cos\alpha=\frac{adjacent}{hypotenuse}[/tex]

In this case:

[tex]\alpha=30\°\\adjacent=x\\hypotenuse=RU=RS=4[/tex]

Substituting values and solving for "x", we get:

[tex]cos(30\°)=\frac{x}{4}\\\\4*cos(30\°)=x\\\\x=\sqrt{12}[/tex]

Answer:

[tex]comp_{\vec{a}}\vec{b}=0.11 [/tex]

[tex]proj_{\vec{a}}\vec{b}=\left ( \frac{4}{81},\frac{7}{81},\frac{-4}{81} \right )[/tex]  

Step-by-step explanation:

a=(4,7,-4) b=(3,-1,1)

Scalar projection of b onto a

[tex]comp_{\vec{a}}\vec{b}=\frac{a\cdot b}{|a|}[/tex]

[tex]a\cdot b=\left ( 4\times 3 \right )+\left ( 7\times -1 \right )+\left ( -4\times 1 \right )=1[/tex]

[tex]|a|=\sqrt{4^2+7^2+4^2}=9[/tex]

[tex]comp_{\vec{a}}\vec{b}=\frac{a\cdot b}{|a|}=\frac{1}{9}\\\Rightarrow comp_{\vec{a}}\vec{b}=0.11 [/tex]

Vector projection of b onto a

[tex]proj_{\vec{a}}\vec{b}=\frac{a\cdot b}{|a|^2}\cdot a[/tex]

[tex]\frac{a\cdot b}{|a|}=\frac{1}{9}[/tex]

[tex]\frac{a\cdot b}{|a|^2}\cdot a=\frac{1}{81}\left ( {4},{7},{-4} \right )[/tex]

[tex]proj_{\vec{a}}\vec{b}=\left ( \frac{4}{81},\frac{7}{81},\frac{-4}{81} \right )[/tex]  

The scalar projection of vector b onto vector a is calculated as 1/9 and the vector projection is calculated as (4/81, 7/81, -4/81).

The scalar projection of vector b onto a is calculated as the dot product of b and a divided by the magnitude of a.

So, first we calculate a.b = (4*3) + (7*-1) + (-4*1) = 12 - 7 - 4 = 1.

The magnitude of a is the square root of the sum of squares of its components, √(4^2 + 7^2 + -4^2) = √81= 9.

Therefore, the scalar projection is 1/9.

For vector projection, we multiply the scalar projection by the vector a divided by its magnitude, essentially scaling the a vector by the scalar projection.

This gives us (1/9) * (4/9, 7/9, -4/9) = (4/81, 7/81, -4/81).

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Before you do anything, you have to find [tex]c[/tex] such that [tex]f_{X,Y}(x,y)[/tex] is a proper joint density function. Doing the math, you'll find that [tex]c=2[/tex].

Now, determine the marginal densities:

[tex]f_X(x)=\displaystyle\int_{-\infty}^\infty f_{X,Y}(x,y)\,\mathrm dy=\int_{-x}^x2(x^2-y^2)e^{-2x}\,\mathrm dy[/tex]

[tex]\implies f_X(x)=\dfrac83x^3e^{-2x}[/tex]

[tex]f_Y(y)=\displaystyle\int_{-\infty}^\infty f_{X,Y}(x,y)\,\mathrm dx=\int_0^\infty2(x^2-y^2)e^{-2x}\,\mathrm dx[/tex]

[tex]\implies f_Y(y)=\dfrac12-y^2[/tex]

a. Then the density of [tex]X[/tex] conditioned on [tex]Y=y[/tex] is

[tex]f_{X\mid Y}(x\mid Y=y)=\dfrac{f_{X,Y}(x,y)}{f_Y(y)}=\dfrac{4(x^2-y^2)e^{-2x}}{1-2y^2}[/tex]

b. The density of [tex]Y[/tex] conditioned on [tex]X=x[/tex] is

[tex]f_{Y\mid X}(y\mid X=x)=\dfrac{f_{X,Y}(x,y)}{f_X(x)}=\dfrac{3(x^2-y^2)}{4x^3}[/tex]

and so the distribution of [tex]Y[/tex] conditioned on [tex]X=x[/tex] is

[tex]F_{Y\mid X}(y\mid X=x)=\displaystyle\int_{-\infty}^uf_{Y\mid X}(y\mid X=x)\,\mathrm du[/tex]

[tex]F_{Y\mid X}(y\mid X=x)=\begin{cases}0&\text{for }y<-x\\\frac{2x^3+3x^2y-y^3}{4x^3}&\text{for }-x\le y\le x\\1&\text{for }y>x\end{cases}[/tex]

To find the conditional probability density of X, given Y=y>0, use Bayes' theorem. To find the conditional probability distribution of Y, given X=x, integrate the joint density over the range of y values.

To find the conditional probability density of X, given Y=y>0, we need to calculate the conditional density fX|Y(x,y). This can be done using Bayes' theorem. First, find the marginal density of Y by integrating the joint density over the range of y values:

fY(y) = ∫f(x,y) dx = c(e^(-2y) - e^(-2y)/3)

Then, use Bayes' theorem to find the conditional density:

fX|Y(x,y) = f(x,y)/fY(y) = 4(x^2-y^2)e^(-2x)/(1-2y^2)

To find the conditional probability distribution of Y, given X=x, we need to calculate the conditional distribution FY|X(y|x). This can be found by integrating the joint density over the range of y values:

FY|X(y|x) = ∫f(x,y) dy = 3/4(x^2-y^2)

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Answer:

The monthly payment is $3583.63 ( approx )

Step-by-step explanation:

Given,

The total cost of the home = $1,250,000

There is a downpayment of $400,000,

Thus, the present value of the loan, PV =  1250000 - 400,000 = $ 850,000

Annual rate = 3 % = 0.03,

So, the monthly rate, r = [tex]\frac{0.03}{12}=\frac{1}{400}[/tex]

And, time ( in years ) = 30

So, the number of months, n = 12 × 30 = 360

Hence, the monthly payment of the loan,

[tex]P=\frac{PV(r)}{1-(1+r)^{-n}}[/tex]

[tex]=\frac{850000(\frac{1}{400})}{1-(1+\frac{1}{400})^{-360}}[/tex]

[tex]=3583.6342867[/tex]

[tex]\approx \$3583.63[/tex]