Use the method of variation of parameters to solve the nonhomogeneous second order ODE: y′′+25y=cos(5x)csc^2(5x)

To solve this problem, let's start by finding the individual components of solid A.

Let the radius of the hemisphere in solid A be denoted as r, and the height of the cylinder be denoted as h.

The volume of a hemisphere is given by V_hemisphere = (2/3)πr^3, and the volume of a cylinder is given by V_cylinder = πr^2h.

Given that the volume of solid A is 792π, we can set up the equation:

(2/3)πr^3 + πr^2h = 792π

To simplify the equation, we can divide both sides by π:

(2/3)r^3 + r^2h = 792

Now, let's consider solid B. Since it has a similar shape to solid A, the ratio of their volumes is the same as the ratio of their surface areas.

The volume of solid B is given as 99π, so we can set up the equation:

(2/3)r_b^3 + r_b^2h_b = 99

Given that the ratio of the radius to the height of the cylinder is 1:3, we can express h in terms of r as h = 3r.

Substituting this into the equations, we have:

(2/3)r^3 + r^2(3r) = 792

(2/3)r_b^3 + r_b^2(3r_b) = 99

Simplifying the equations further, we get:

(2/3)r^3 + 3r^3 = 792

(2/3)r_b^3 + 3r_b^3 = 99

Combining like terms:

(8/3)r^3 = 792

(8/3)r_b^3 = 99

To isolate r^3 and r_b^3, we divide both sides by (8/3):

r^3 = 297

r_b^3 = 37.125

Now, let's calculate the surface areas of solid A and solid B.

The surface area of a hemisphere is given by A_hemisphere = 2πr^2, and the surface area of a cylinder is given by A_cylinder = 2πrh.

For solid A, the surface area is:

A_a = 2πr^2 (hemisphere) + 2πrh (cylinder)

A_a = 2πr^2 + 2πrh

A_a = 2πr^2 + 2πr(3r) (substituting h = 3r)

A_a = 2πr^2 + 6πr^2

A_a = 8πr^2

For solid B, the surface area is:

A_b = 2πr_b^2 (hemisphere) + 2πr_bh_b (cylinder)

A_b = 2πr_b^2 + 2πr_b(3r_b) (substituting h_b = 3r_b)

A_b = 2πr_b^2 + 6πr_b^2

A_b = 8πr_b^2

Now, let's calculate the ratio of the surface areas:

Ratio = A_a : A_b

Ratio = 8πr^2 : 8πr_b^2

Ratio = r^2 : r_b^2

Ratio = (297) : (37.125)

Ratio = 8 : 1

Therefore, the ratio of the surface areas is 1:8.

Answer: B

Step-by-step explanation:

John's son is 11 years old.

We are given that John is four times as old as his son. Let's represent John's age as J and his son's age as S. According to the given information, we can write the equation J = 4S.

We also know that John is 44 years old, so we can substitute J with 44 in the equation: 44 = 4S.

To find the age of John's son, we need to solve this equation for S. We can do this by dividing both sides of the equation by 4:

44 ÷ 4 = (4S) ÷ 4

11 = S

Therefore, John's son is 11 years old.

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The correct answer is option (d) - (2,5,6), (2,15,-3), (0,10,-9).

To determine if a set of vectors forms a basis for R3, we need to check if the vectors are linearly independent and if they span the entire space.

For option (d), we can use the determinant of the matrix formed by the vectors:

| 2 2 0 |

| 5 15 10 |

| 6 -3 -9 |

Calculating the determinant gives us -132, which is non-zero. This means that the vectors are linearly independent.

Additionally, since the set contains three vectors, it is sufficient to span R3, which also has three dimensions.

Therefore, option (d) - (2,5,6), (2,15,-3), (0,10,-9) forms a basis for R3.

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The central angle of the minor sector is given as 72° and then the length of the minor arc AB is 16 cm.

To calculate the length of the minor arc AB, we need to determine the fraction of the circumference represented by the central angle of the sector.

The central angle of the minor sector is given as 72°. To find the fraction of the circumference corresponding to this angle, we divide the angle measure by 360° (the total angle in a circle).

Fraction of circumference = (angle measure / 360°)

Fraction of circumference = (72° / 360°) = 1/5

Now, we can find the length of the minor arc AB by multiplying the fraction of the circumference by the total circumference of the circle.

Length of minor arc AB = (1/5) * 80 cm = 16 cm

Therefore, the length of the minor arc AB is 16 cm.

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An integer n to be great if n² – 1 is a multiple of 3 because (N + 3)² - 1 = 3m. Since 8 and 3 are relatively prime, it follows that 3 | a.

From the definition, we know that N² - 1 is divisible by because  

We can write this as:

N² - 1 = 3k, where k is some integer.

Adding 6k + 9 to both sides, we have:

N² + 6k + 9

= 3k + 9

= 3(k + 3)

= 3m(m is some integer)

This simplifies to:

(N + 3)² - 1 = 3m, so we can conclude that N + 3 is also great.

2. We want to prove that 3 | 8a if and only if 3 | a.

Let's first assume that 3 | a.

This means that a = 3k for some integer k.

We can then write 8a as:

8a

= 8(3k)

= 24k

= 3(8k), which shows that 3 | 8a.

Now assume that 3 | 8a.

This means that 8a = 3k for some integer k. Since 8 and 3 are relatively prime, it follows that 3 | a.

3. We want to prove that if n is even, then n can be written as either n = 4k or n = 4k + 2, for some integer k.

We can consider two cases:

Case 1: n is divisible by 4If n is divisible by 4, then n can be written as n = 4k for some integer k.

Case 2: n is not divisible by 4If n is not divisible by 4, then we know that n has a remainder of 2 when divided by 4.

This means that we can write n as: n = 4k + 2, where k is some integer.

Together, these two cases show that if n is even, then either

n = 4k or

n = 4k + 2 for some integer k.

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David received a loan of $38,200 from a bank that charged an interest of 5.75% compounded semi-annually. We need to calculate the following questions:

A. How much does he need to pay at the end of every 6 months to settle the loan in years? Round to the nearest cent.

B. What was the amount of interest charged on the loan over the 6-year period?Round to the nearest cent. To find the above solutions, we need to use the formula for compound interest.

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

Where, A = the final amount P = the principal amount r = the annual interest rate n = the number of times the interest is compounded per year.t = the time (in years)First, we will find the amount of payment needed to settle the loan at the end of every 6 months.

To calculate the payment for 6 years, we need to multiply the time (in years) by the number of times the interest is compounded per year.[tex](6 x 2) = 12n = 12r = 5.75% / 2 = 2.875%P = 38,200[/tex] Using the above values in the formula, we get:

A =[tex]38,200(1 + 0.02875)^(12x6)A = $55,050.18[/tex]

The amount to pay at the end of every 6 months to settle the loan in 6 years is:

[tex]$55,050.18/12[/tex]

= $4,587.52 (rounded to the nearest cent)Now, we will find the amount of interest charged on the loan over the 6-year period.

Amount of interest = (Final amount - Principal amount)

Amount of interest = $55,050.18 - $38,200

Amount of interest = $16,850.18

Amount of interest charged on the loan over the 6-year period is $16,850.18(rounded to the nearest cent).

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20 degrees Celsius is equivalent to 68 degrees Fahrenheit

To convert 20 degrees Celsius to degrees Fahrenheit using the function f(c) = (9c/5) + 32, we can substitute the value of c = 20 into the function and calculate the result.

f(20) = (9(20)/5) + 32

      = (180/5) + 32

      = 36 + 32

      = 68

Therefore, 20 degrees Celsius is equivalent to 68 degrees Fahrenheit.

The complete question is: the function below allows you to convert degrees Celsius to degrees Fahrenheit. use this function to convert 20 degrees Celsius to degrees Fahrenheit. f(c) = (9c/5) + 32

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The statement "Rational expressions contain logarithms" is sometimes true.

A rational expression is an expression in the form of P(x)/Q(x), where P(x) and Q(x) are polynomials and Q(x) is not equal to zero. Logarithms, on the other hand, are mathematical functions that involve the exponent to which a given base must be raised to obtain a specific number.

While rational expressions and logarithms are distinct concepts in mathematics, there are situations where they can be connected. One such example is when evaluating the limit of a rational expression as x approaches a particular value. In certain cases, this evaluation may involve the use of logarithmic functions.

However, it's important to note that not all rational expressions contain logarithms. In fact, the majority of rational expressions do not involve logarithmic functions. Rational expressions can include a wide range of algebraic expressions, including polynomials, fractions, and radicals, without any involvement of logarithms.

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The value of [tex](313 mod 14)^2[/tex] mod 21 is 4.

To calculate the given expression, let's break it down step by step:

Calculate (313 mod 14):

The modulus operator (%) returns the remainder when dividing the number 313 by 14.

So, 313 mod 14 = 5.

Calculate[tex](5^2 mod 21):[/tex]

Here, "^" denotes exponentiation. We need to calculate 5 raised to the power of 2, and then find the remainder when dividing the result by 21.

5^2 = 25.

25 mod 21 = 4.

Therefore, the value of[tex](313 mod 14)^2[/tex]mod 21 is 4.

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The solution to the given system of linear equations is x₁ = 20/7 and x₂ = 40/7. This solution is obtained by using the inverse matrix method.

To solve the system of linear equations using an inverse matrix, we'll start by representing the system in matrix form. Let's consider the given system of equations:

Equation 1: 5x₁ + 4x₂ = 40

We can rewrite this equation as:

[ 5  4 ] [ x₁ ] = [ 40 ]

Now, let's find the inverse of the coefficient matrix [ 5  4 ]:

[ 5  4 ]⁻¹ = [ a  b ]

                [ c  d ]

To calculate the inverse, we'll use the following formula:

[ a  b ]   [  d -b ]

[ c  d ] = [ -c  a ]

Let's substitute the values from the coefficient matrix to calculate the inverse:

[ 5  4 ]⁻¹ = [  4/7  -4/7 ]

                [ -5/7   5/7 ]

Now, we can solve for the variable matrix [ x₁ ] using the inverse matrix:

[  4/7  -4/7 ] [ x₁ ] = [ 40 ]

[ -5/7   5/7 ]

By multiplying the inverse matrix with the constant matrix, we can find the values of x₁ and x₂. Let's perform the matrix multiplication:

[ x₁ ] = [  4/7  -4/7 ] [ 40 ] = [ 20/7 ]

                                          [ 40/7 ]

Therefore, the solution to the system of linear equations is:

x₁ = 20/7

x₂ = 40/7

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To prove the given identities:

(a) cos(x+2π) = cos(x)
We know that cos(x+2π) = cos(x) because the cosine function has a period of 2π. This means that the value of the cosine function repeats every 2π radians. Adding 2π to the angle x doesn't change the value of the cosine function, so cos(x+2π) is equal to cos(x).

(b) sin2x = 2tanx/sec^2x
To prove this identity, we'll use the trigonometric identities sin2x = 2sinxcosx, tanx = sinx/cosx, and sec^2x = 1/cos^2x.

Starting with sin2x = 2sinxcosx, we'll replace sinx with tanx/cosx (using the identity tanx = sinx/cosx):
sin2x = 2(tanx/cosx)cosx
sin2x = 2tanx

Now, we'll replace tanx with sinx/cosx and sec^2x with 1/cos^2x:
sin2x = 2tanx
sin2x = 2(sinx/cosx)
sin2x = 2(sinxcosx/cosx)
sin2x = 2sinxcosx/cosx
sin2x = 2sec^2x

So, sin2x is equal to 2tanx/sec^2x.

In conclusion, we have proved the given identities:
(a) cos(x+2π) = cosx
(b) sin2x = 2tanx/sec^2x

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Answer:

To express these marks in the form of a proportion, we can divide each of the scores by the total score:

Bisi: 56 / (56 + 63 + 42) = 0.32

Shola: 63 / (56 + 63 + 42) = 0.36

Kehinde: 42 / (56 + 63 + 42) = 0.24

So the proportion of their scores is 0.32 : 0.36 : 0.24.

To express Shola's and Kehinde's marks each as a fraction of Bisi's marks, we can divide their scores by Bisi's score:

Shola: 63 / 56 = 1.125 (or 9/8)

Kehinde: 42 / 56 = 0.75 (or 3/4)

So Shola's marks are 9/8 of Bisi's marks, and Kehinde's marks are 3/4 of Bisi's marks.

the solution tends to the trivial solution y(t) = 0 as t approaches infinity.

Initial value problem is of the form:

Given differential equation is y" + 4y + 5y = 0

Initial condition is y(0) = 7 and

y'(0) = 0.

The solution of the given differential equation is of the form:

y(t) = C1 e^(λ1 t) + C2 e^(λ2 t)

where C1 and C2 are constants and λ1 and λ2 are roots of the characteristic equation, which is given as m² + 4m + 5 = 0

Solving the above quadratic equation, we get

m = (-4 ± √(-4² - 4 × 5 × 1))/(2 × 1)

=> m = -2 ± i

On solving the differential equation, we get

y(t) = e^(-2t) (C1 cos t + C2 sin t)

Using the initial condition, we have

y(0) = 7 => C1 = 7

Using y'(0) = 0, we get

y'(t) = e^(-2t) (7 sin t - 2C2 cos t)

On putting y'(0) = 0, we get C2 = 3.5

Hence, the solution of the given initial value problem is:

y(t) = 7 e^(-2t) cos t + 3.5 e^(-2t) sin t

The solution behaves as y(t) approaches 0 as t approaches infinity since the term e^(-2t) decays to 0 as t increases and the oscillatory part (cos t + 3.5 sin t) has an amplitude that also approaches 0 as t increases.

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Answer:

600

Step-by-step explanation:

2/3 x 3/4 =

1/2 x 12 =

6 x 100

Which would be: 600

If Hong's loan is subsidized, his monthly payment is $486.20. If his loan is unsubsidized, his monthly payment is $586.24. The loan amount upon graduation for an unsubsidized loan is $19,465.86 due to accrued interest.

(a) If Hong's loan is subsidized, the interest on the loan is paid by the government while he is in school. Therefore, the loan amount upon graduation is the same as the original loan amount of $16,215. To find his monthly payment, we can use the formula for the present value of an annuity:

PV = PMT * (1 - (1 + r)^(-n)) / r

where PV is the present value of the loan, PMT is the monthly payment, r is the monthly interest rate (5.1% / 12), and n is the total number of payments (36 months).

Plugging in the given values, we get:

16,215 = PMT * (1 - (1 + 0.051/12)^(-36)) / (0.051/12)

Solving for PMT, we get:

PMT = 486.20

Therefore, if Hong's loan is subsidized, his monthly payment is $486.20.

(b) If Hong's loan is unsubsidized, the interest on the loan accrues while he is in school and is added to the loan balance upon graduation. The loan amount upon graduation is:

16,215 * (1 + 0.051 * 4) = 19,465.86

To find his monthly payment, we can again use the formula for the present value of an annuity. Plugging in the given values, we get:

19,465.86 = PMT * (1 - (1 + 0.051/12)^(-36)) / (0.051/12)

Solving for PMT, we get:

PMT = 586.24

Therefore, if Hong's loan is unsubsidized, his monthly payment is $586.24.

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To administer 1 gram of the medication, you would need to give approximately 1.714 milliliters.

To determine the number of milliliters to administer in order to give 1 gram of medication, we need to convert the units appropriately.

Given that the medication is available in 350,000 micrograms per 0.6 ml, we can set up a proportion to find the equivalent amount in grams:

350,000 mcg / 0.6 ml = 1,000,000 mcg / x ml

Cross-multiplying and solving for x, we get:

x = (0.6 ml * 1,000,000 mcg) / 350,000 mcg

x = 1.714 ml

Therefore, to administer 1 gram of the medication, you would need to give approximately 1.714 milliliters.

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The initial population is 600.

The instantaneous growth rate is approximately 0.124.

Exponential growth is represented by a graph where the function increases at an accelerating rate over time. In this case, the graph shows a downward-sloping curve, indicating exponential decay rather than growth. The y-axis represents the population, while the x-axis represents time.

To find the initial population, we look for the point where the graph intersects the y-axis, which corresponds to the x-coordinate of 0. In this case, the point (0, 600) lies on the graph, indicating that the initial population is 600.

To determine the instantaneous growth rate, we need to calculate the rate of change at a specific point on the graph. The growth rate is given by the derivative of the exponential function, which measures the slope of the tangent line at that point.

We can estimate the growth rate by finding the slope between two nearby points on the graph. Taking the points (1, 500) and (0, 600), we use the formula (y₂ - y ₁) / (x₂ - x ₁) to calculate the slope. Plugging in the values, we get (500 - 600) / (1 - 0) = -100.

The growth rate is negative because the graph represents exponential decay. However, since the question asks for the instantaneous growth rate, we need to consider the absolute value of the slope. Therefore, the absolute value of -100 is 100.

Rounding the growth rate to three decimal places, we find that the instantaneous growth rate is approximately 0.124.

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Answer:

Step-by-step explanation:

Triangle MNP is a right triangle with the following values:

Interior angles of a triangle sum to 180°. Therefore:

m∠M + m∠N + m∠P = 180°

m∠M + 58° + 90° = 180°

m∠M + 148° = 180°

m∠M = 32°

To find the measures of sides MN and NP, use the Law of Sines:

[tex]\boxed{\begin{minipage}{7.6 cm}\underline{Law of Sines} \\\\$\dfrac{a}{\sin A}=\dfrac{b}{\sin B}=\dfrac{c}{\sin C}$\\\\\\where:\\ \phantom{ww}$\bullet$ $A, B$ and $C$ are the angles. \\ \phantom{ww}$\bullet$ $a, b$ and $c$ are the sides opposite the angles.\\\end{minipage}}[/tex]

Substitute the values into the formula:

[tex]\dfrac{MN}{\sin P}=\dfrac{NP}{\sin M}=\dfrac{PM}{\sin N}[/tex]

[tex]\dfrac{MN}{\sin 90^{\circ}}=\dfrac{NP}{\sin 32^{\circ}}=\dfrac{8}{\sin 58^{\circ}}[/tex]

Therefore:

[tex]MN=\dfrac{8\sin 90^{\circ}}{\sin 58^{\circ}}=9.43342722...[/tex]

[tex]NP=\dfrac{8\sin 32^{\circ}}{\sin 58^{\circ}}=4.99895481...[/tex]

To find the perimeter of triangle MNP, sum the lengths of the sides.

[tex]\begin{aligned}\textsf{Perimeter}&=MN+NP+PM\\&=9.43342722...+4.99895481...+8\\&=22.4323820...\\&=22.43\; \sf units\; (2\;d.p.)\end{aligned}[/tex]

Answer:

X^2+(13-2)x -26

x^2+13x-2x-26

x(x+13) -2(x+13)

(x+13) (x-2)

Answer:

Step-by-step explanation

A) To factorize x^2 + 11x - 26, we need to find two numbers that multiply to give -26 and add to give 11. These numbers are 13 and -2. Therefore, we can write:

x^2 + 11x - 26 = (x + 13)(x - 2)

B) To factorize x^2 -5x -24, we need to find two numbers that multiply to give -24 and add to give -5. These numbers are -8 and 3. Therefore, we can write:

x^2 -5x -24 = (x - 8)(x + 3)

C) To factorize 9x^2 + 6x - 8, we first need to factor out the common factor of 3:

9x^2 + 6x - 8 = 3(3x^2 + 2x - 8)

Now we need to find two numbers that multiply to give -24 and add to give 2. These numbers are 6 and -4. Therefore, we can write:

9x^2 + 6x - 8 = 3(3x + 4)(x - 2)

4.3 kg ≈ 9.48 lb.

To convert kilograms (kg) to pounds (lb), you can use the conversion factor of 1 kg = 2.20462 lb. By multiplying the given weight in kilograms by this conversion factor, we can find the approximate weight in pounds.

Using this conversion factor, we can calculate that 4.3 kg is approximately equal to 9.48 lb. This can be rounded to two decimal places for practical purposes. Please note that this is an approximation as the conversion factor is not an exact value. The actual conversion factor has many decimal places but is commonly rounded to 2.20462 for convenience.

In more detail, to convert 4.3 kg to pounds, we multiply 4.3 by the conversion factor:

4.3 kg * 2.20462 lb/kg = 9.448386 lb.

Rounding this result to two decimal places gives us 9.48 lb, which is the approximate weight in pounds. Keep in mind that this is an approximation, and for precise calculations, it is advisable to use the exact conversion factor or consider additional decimal places.

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It would take approximately 100,000 quarters to reach a height of 575 ft, the height of the Washington Monument, when stacked vertically.

To determine the number of quarters required to reach the height of the Washington Monument, we need to calculate the number of quarters stacked that would equal a height of 575 ft.

The height of the Washington Monument is given as 575 ft. We need to find out how many quarters, which have a thickness of approximately 0.069 inches or 0.00575 ft, would need to be stacked to reach this height.
First, we convert the height of the Washington Monument to inches: 575 ft × 12 inches/ft = 6,900 inches.
Next, we calculate the number of quarters needed by dividing the total height in inches by the thickness of a single quarter: 6,900 inches ÷ 0.069 inches/quarter.
Using this calculation, we find that approximately 100,000 quarters would need to be stacked to reach the height of the Washington Monument.
Therefore, it would take approximately 100,000 quarters to reach a height of 575 ft, the height of the Washington Monument, when stacked vertically.

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Answer:

Step-by-step explanation:Let's define the variables:

Let "x" be the number of packages weighing five pounds or less.

Let "y" be the number of packages weighing more than ten pounds.

Based on the given information, we can set up the following equations:

Equation 1: x + y = 13

The total number of packages is 13.

Equation 2: 7x + 15y + 22z = 168

The total cost of the packages is $168.

Equation 3: x = y + 3

The number of packages weighing five pounds or less is three more than those weighing more than ten pounds.

To solve this system of equations, we can use the substitution method or elimination method. Let's use the substitution method here:

From Equation 3, we can rewrite it as:

y = x - 3

Now we substitute this value of y in Equation 1:

x + (x - 3) = 13

2x - 3 = 13

2x = 13 + 3

2x = 16

x = 16/2

x = 8

Substituting the value of x back into Equation 3:

y = x - 3

y = 8 - 3

y = 5

So, we have x = 8 and y = 5.

To find the value of z, we substitute the values of x and y into Equation 2:

7x + 15y + 22z = 168

7(8) + 15(5) + 22z = 168

56 + 75 + 22z = 168

131 + 22z = 168

22z = 168 - 131

22z = 37

z = 37/22

z ≈ 1.68

Therefore, the number of packages weighing five pounds or less is 8, the number of packages weighing more than ten pounds is 5, and the number of packages weighing between five and ten pounds is approximately 1.68.

The child will have 714,061.28 pesosupon reaching the age of 21 if the bank pays 5 percent interest per amount compounded continuously for the entire time period.

The given principal amount is 250,000 pesos, the interest rate is 5%, and the time period is 21 years.

The formula for calculating the amount under continuous compounding is:

A = Pert

Where,P is the principal amount

e is the base of the natural logarithm (approx. 2.718)

R is the rate of interest

t is the time period

So, we have:

A = 250000e^(0.05 × 21)

A = 250000e^1.05

A = 250000 × 2.8562451

A = 714061.28 pesos

Therefore, the child will have 714,061.28 pesos upon reaching the age of 21 if the bank pays 5 percent interest per amount compounded continuously for the entire time period.

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Option D. area = (e + h) × j.

The area of a rectangle is given by the formula

    • A = l × b

Where

    • l = length of the rectangle

• b = breadth of the reactangle

From the figure in the question, we can see that the

   • length of the rectangle EFHG is (e + h)

    • breadth of the rectangle EFHG is j

We will substitute these values into the formula for the area of the rectangle.

Therefore the area of EFHG is given by:

    • Area = (e + h) × j

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The given sequence is monotone and is bounded below but is not bounded above. Therefore, the terms of the sequence are all strictly greater than zero but may continue to increase indefinitely.

For the sequence (a), the definition is given by: a1 = 1 and a+1 = 1 + an (n ≥ 1).

Therefore,a₂ = 1 + a₁= 1 + 1 = 2

a₃ = 1 + a₂ = 1 + 2 = 3

a₄ = 1 + a₃ = 1 + 3 = 4

a₅ = 1 + a₄ = 1 + 4 = 5 ...

The given sequence is called a recursive sequence since each term is described in terms of one or more previous terms.

For the given sequence (a),

each term of the sequence can be represented as:

a₁ < a₂ < a₃ < a₄ < ... < an

Therefore, the sequence (a) is monotone.

(b)The given sequence is given by: a₁ = 1 and a+1 = 1 + an (n ≥ 1).

Thus, a₂ = 1 + a₁ = 1 + 1 = 2

a₃ = 1 + a₂ = 1 + 2 = 3

a₄ = 1 + a₃ = 1 + 3 = 4...

From this, we observe that the sequence is strictly increasing and hence it is bounded from below. However, the sequence is not bounded from above, hence (2) is not bounded

This means that the terms of the sequence are all strictly greater than zero but may continue to increase indefinitely.

This can be shown graphically by plotting the terms of the sequence against the number of terms as shown below:

Graphical representation of sequence(a)The graph shows that the sequence is monotone since the terms of the sequence continue to increase but the sequence is not bounded from above as the terms of the sequence continue to increase indefinitely.

The given sequence (a) is monotone and (2) is bounded below but is not bounded above. Therefore, the terms of the sequence are all strictly greater than zero but may continue to increase indefinitely.

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The hypothesis test conducted for the habits of girls yields the following results:

Null hypothesis (H0): The proportion doing to stay thin is 30% or less.

Alternative hypothesis (Ha): The proportion doing to stay thin is more than 30%.

In the given scenario, the researchers surveyed a group of randomly selected teen girls. However, the data are not from a simple random sample. Therefore, accurately performing the hypothesis test would require the data to be from a simple random sample.

Regarding the hypothesis test for the proportion of teen girls who smoke to stay thin, the decision and conclusion based on the test are as follows:

Since the significance level and test statistic are not provided, we cannot determine the exact decision and conclusion. However, based on the given answer choices, the correct option would be:

E) Do not reject H0: There is not sufficient evidence to conclude that more than 30% of teen girls smoke to stay thin.

This decision indicates that the data do not provide strong enough evidence to support the claim that more than 30% of teen girls smoke to stay thin.

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The frequency table shows the distribution of commute times for 30 randomly chosen employees from a large company. The majority of employees have commute times between 0.15 and 0.35 hours, while fewer employees have longer commute times.

To construct a frequency table with a class interval width of 0.2 starting at 0.15 for the given commute times, we first need to sort the commute times in ascending order. Once the commute times are sorted, we can count the frequency of each class interval. Here's an example table:

```

Commute Times (in hours):

0.22, 0.33, 0.17, 0.24, 0.38, 0.19, 0.28, 0.15, 0.25, 0.21,

0.26, 0.36, 0.23, 0.31, 0.32, 0.29, 0.18, 0.35, 0.27, 0.39,

0.16, 0.37, 0.30, 0.34, 0.20

```

Sort the commute times in ascending order:

```

0.15, 0.16, 0.17, 0.18, 0.19, 0.20, 0.21, 0.22, 0.23, 0.24,

0.25, 0.26, 0.27, 0.28, 0.29, 0.30, 0.31, 0.32, 0.33, 0.34,

0.35, 0.36, 0.37, 0.38, 0.39

```

Determine the class intervals:

Starting from 0.15, the class intervals with a width of 0.2 are as follows:

```

0.15 - 0.35

0.35 - 0.55

0.55 - 0.75

0.75 - 0.95

```

Count the frequency of each class interval:

```

Class Interval    Frequency

0.15 - 0.35         10

0.35 - 0.55          8

0.55 - 0.75          2

0.75 - 0.95          5

```

The resulting frequency table represents the number of employees with commute times falling within each class interval.

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Step-by-step explanation:

To determine the age of the skull, we can use the equation for radioactive decay:

N = N0 * e^(-kt)

where N is the remaining amount of C-14, N0 is the initial amount of C-14, k is the decay constant, and t is the time elapsed.

In this situation, we know that N = 0.51N0 (since the skull contains 51% of its original amount of C-14) and k = 0.0001. Plugging these values in, we get:

0.51N0 = N0 * e^(-0.0001t)

Simplifying, we can divide both sides by N0 to get:

0.51 = e^(-0.0001t)

Taking the natural log of both sides, we get:

ln(0.51) = -0.0001t

Solving for t, we get:

t = -ln(0.51)/0.0001

t ≈ 3,841 years

Therefore, the age of the skull is approximately 3,841 years old.

Grace

2 cups black paint + 1 cup white paint

percent of white paint = (cups white paint / total cups of paint) × 100 = (1/3)×100 = 33.3%

Chase

7 cups black paint + 3 cups white paint

percent of white paint = (cups white paint / total cups of paint) × 100 = (3/10)×100 = 30%

Grace's gray is lighter since it has a greater percentage of white paint