If x2+4x+c is a perfect square trinomial, which of the following options has a valid input for c ? Select one: a. x2+4x+1 b. x2−4x+4 C. x2+4x+4 d. x2+2x+1

Assuming continuous compounding with a 5 percent interest rate, a depositor placing 250,000 pesos in an account established for a child at birth will have a significant amount upon reaching the age of 21.

Continuous compounding is a mathematical concept where interest is compounded an infinite number of times within a given time period. The formula for calculating the amount A after a certain time period with continuous compounding is given by A = P * e^(rt), where P is the principal amount, r is the interest rate, t is the time period in years, and e is the base of the natural logarithm.

In this case, the principal amount (P) is 250,000 pesos, the interest rate (r) is 5 percent (or 0.05 as a decimal), and the time period (t) is 21 years. Plugging these values into the formula, we have[tex]A = 250,000 * e^(0.05 * 21).[/tex]

Using a calculator, we can evaluate this expression to find the final amount. After performing the calculation, the child will have approximately 745,536.32 pesos upon reaching the age of 21.

Therefore, the child will have around 745,536.32 pesos in the account when the continuous compounding with a 5 percent interest rate is applied for the entire time period.

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Answer:

RS + ST = RT

9 + 2x - 6 = x + 7

2x - 3 = x + 7

x = 10

Answer:

zeroes of the equations are x= 1 , -3      

Step-by-step explanation:

firstly divide both sides by 2 so new equation will be

x^2+2x-3=0

you can use quadratic formula or simply factor it

its factors will be

x^2 +3x - x -3=0

(x+3)(x-1)=0

are two factors

so

either

x+3=0             or          x-1=0

x=-3                 and        x=1  

so zeroes of the equations are x= 1 , -3      

by the way you can also use quadratic formula which is

[-b+-(b^2 -4ac)]/2a

where a is coefficient of x^2 and b is coefficient of x

and c is constant term

The investment will take 1 year and 4 months to mature. In 16 months, the initial amount of $1298.00 will accumulate to $1423.00 at a 3% annual interest rate compounded semi-annually.

To calculate the time it takes for an investment to accumulate to a certain amount, we can use the compound interest formula:

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

Where:

A = Final amount ($1423.00)

P = Principal amount ($1298.00)

r = Annual interest rate (3% or 0.03)

n = Number of times interest is compounded per year (2 for semi-annual)

t = Time in years

We need to solve for t in this equation. Rearranging the formula:

t = (1/n) * log(A/P) / log(1 + r/n)

Plugging in the values:

t = (1/2) * log(1423/1298) / log(1 + 0.03/2)

Calculating this equation, we find t to be approximately 1.33 years, which is equivalent to 1 year and 4 months.

compound interest calculations and the formula used to determine the time it takes for an investment to accumulate to a specific amount.

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The monthly mortgage payment for a $100,000 loan with a 5% annual interest rate and a 30-year fully amortizing term is approximately $536.82.

To calculate the monthly mortgage payment, we can use the formula for calculating the fixed monthly payment for a fully amortizing loan. The formula is: M = P * (r * (1 + r)^n) / ((1 + r)^n - 1)

Where:

M = Monthly mortgage payment

P = Principal balance

r = Monthly interest rate (annual interest rate divided by 12 and converted to a decimal)

n = Total number of monthly payments (loan term multiplied by 12)

Plugging in the given values into the formula:

P = $100,000

r = 0.05/12 (5% annual interest rate divided by 12 months)

n = 30 years * 12 (loan term converted to months)

M = 100,000 * (0.004166667 * (1 + 0.004166667)^(3012)) / ((1 + 0.004166667)^(3012) - 1)

M ≈ $536.82

Therefore, the monthly mortgage payment for a $100,000 loan with a 5% annual interest rate and a 30-year fully amortizing term is approximately $536.82.

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To find the inverse Laplace transform of the given function F(s) = (5-10s)/(s² + 11s + 24), we can use the method of partial fractions.

Step 1: Factorize the denominator of F(s)
The denominator of F(s) is s² + 11s + 24, which can be factored as (s + 3)(s + 8).

Step 2: Decompose F(s) into partial fractions
We can write F(s) as:
F(s) = A/(s + 3) + B/(s + 8)

Step 3: Solve for A and B
To find the values of A and B, we can equate the numerators of the fractions and solve for A and B:
5 - 10s = A(s + 8) + B(s + 3)

Expanding and rearranging the equation, we get:
5 - 10s = (A + B)s + (8A + 3B)

Comparing the coefficients of s on both sides, we have:
-10 = A + B    ...(1)

Comparing the constant terms on both sides, we have:
5 = 8A + 3B    ...(2)

Solving equations (1) and (2), we find:
A = 1
B = -11

Step 4: Write F(s) in terms of the partial fractions
Now that we have the values of A and B, we can rewrite F(s) as:
F(s) = 1/(s + 3) - 11/(s + 8)

Step 5: Take the inverse Laplace transform
To find L^-1 {F(s)}, we can take the inverse Laplace transform of each term separately.

L^-1 {1/(s + 3)} = e^(-3t)

L^-1 {-11/(s + 8)} = -11e^(-8t)

Therefore, the inverse Laplace transform of F(s) is:
L^-1 {F(s)} = e^(-3t) - 11e^(-8t)

In summary, using partial fractions, the inverse Laplace transform of F(s) = (5-10s)/(s² + 11s + 24) is L^-1 {F(s)} = e^(-3t) - 11e^(-8t).

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No, it is not possible to form a triangle with the given side lengths of √99 yd, √48 yd, and √65 yd.

To determine if it is possible to form a triangle, we need to check if the sum of any two sides is greater than the third side. In this case, let's compare the given side lengths:

√99 yd < √48 yd + √65 yd

9.95 yd < 6.93 yd + 8.06 yd

9.95 yd < 14.99 yd

Since the sum of the two smaller side lengths (√48 yd and √65 yd) is not greater than the longest side length (√99 yd), the triangle inequality theorem is not satisfied. Therefore, it is not possible to form a triangle with these side lengths.

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If I'm sure, there is no simplied form to 14$.

But if it was adding zeros it would be $14.00

Is this what your looking for?

(i) The 90% confidence interval for the population parameter is (27.37, 45.79).

(ii) The interval (boundary values) of the 90% confidence interval is shown on the distribution graph.

After calculating the lower and upper limits using the formula above, the interval is found to be (27.37, 45.79) and  we can be 90% confident that the population parameter lies within this range.

Given the following information:

Random sample of 18 students

Sample standard deviation = 10.49

90% confidence interval

To find:

(i) Form a 90% confidence interval for the population parameter.

(ii) Show the interval (boundary values) on the distribution graph.

The population variance can be estimated using the sample variance. Since the sample size is small (n < 30) and the population variance is unknown, we will use the t-distribution instead of the standard normal distribution (z-distribution). The t-distribution has fatter tails and is flatter than the normal distribution.

The lower limit of the 90% confidence interval is calculated as follows:

Lower Limit = sample mean - (t-value * standard deviation / sqrt(sample size))

The upper limit of the 90% confidence interval is calculated as follows:

Upper Limit = sample mean + (t-value * standard deviation / sqrt(sample size))

The t-value is determined based on the desired confidence level and the degrees of freedom (n - 1). For a 90% confidence level with 17 degrees of freedom (18 - 1), the t-value can be obtained from a t-table or using statistical software.

After calculating the lower and upper limits using the formula above, the interval is found to be (27.37, 45.79).

(ii) Showing the interval (boundary values) on the distribution graph:

The distribution graph of the 90% confidence interval of the variance of the students' final grade is plotted. The range between 27.37 and 45.79 represents the interval. The area under the curve between these boundary values corresponds to the 90% confidence level. Therefore, we can be 90% confident that the population parameter lies within this range.

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a) On solving these equations, we find that q* = 4.

To find the Nash equilibrium, we need to find the values of q1 and q2 where neither firm has an incentive to deviate. In other words, we need to find the point where the reaction curves intersect.

Setting R1(q2) = R2(q1), we get:

12 - 2q2 = 12 - 2q1

Simplifying, we have:

q1 = q2

This implies that in the Nash equilibrium, q1 and q2 must be equal. Let's denote this common value as q*. Substituting q* into the reaction curves, we get:

R1(q*) = 12 - 2q* = q*

R2(q*) = 12 - 2q* = q*

Solving these equations, we find that q* = 4.

b) Starting at qi = 4.1 and q2 = 3.8, firm 1 wants to adjust its output taking q2 as given. Firm 1 wants to maximize its profit, so it will choose q1 such that its reaction curve R1(q2) is tangent to the reaction curve of firm 2, R2(q1). Firm 1 will adjust its output to q* = 3.8, which is the value of q2.

Now, firm 2, taking q1 = 3.8 as given, will adjust its output to q* = 3.8, which is the value of q1. This adjustment by firm 2 is in response to the change made by firm 1.

Graphically, the adjustment can be shown by plotting the initial point (4.1, 3.8) and the new point (3.8, 3.8) on the graph with q1 and q2 axes. Since the adjustment brings the firms to the Nash equilibrium point, the production converges to the Nash equilibrium.

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Suppose P is false and that the statement (R⟶S)⟷(P∧Q) is true.  R can be either true or false while S must be true to satisfy the given statement.

We may examine the logical structure of the statement to determine the truth values of R and S in the statement (R S) (P Q).

Given that P is false regardless of Q's truth value, P Q is also false. This indicates that the right-hand side of the equivalency is incorrect in its entirety.

The left-hand side (R S) must likewise be false since the equivalence () can only be true when both sides have the same truth value. We can take into account the implications included inside (R S) to estimate the truth values of R and S independently.

There are two scenarios in which the inference (R S) is incorrect:

R and S's truth values can thus be any combination of the following possibilities:

Therefore we can conclude that R can be either true or false while S must be true to satisfy the given statement.

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We can conclude that R must be true and S must be false.

To find the truth values of R and S, we can use the given information and the properties of logical equivalences.

We are given that (R ⟶ S) ⟷ (P ∧ Q) is true. Since P is false, (P ∧ Q) will also be false regardless of the truth value of Q. Therefore, (R ⟶ S) ⟷ (P ∧ Q) simplifies to (R ⟶ S) ⟷ false.

To determine the truth values of R and S, we can analyze the implications in the equivalence:

(R ⟶ S) ⟷ false

For the equivalence to be true, we must have one of the following cases:

Case 1: R ⟶ S is true and false is true (which is not possible).

Case 2: R ⟶ S is false and false is false.

Since false ⟶ false is true, the only valid case is when R ⟶ S is false.

Therefore, we can conclude that R must be true and S must be false.

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a. To find 23^100002 mod 41, we can use Fermat's Little Theorem and simplify the expression to 18.

b. To find 43^123456 mod 73, we can use the method of repeated squaring and simplify the expression to 43.

a. To find 23^100002 mod 41, we can use Fermat's Little Theorem, which states that if p is a prime number and a is an integer not divisible by p, then a^(p-1) mod p = 1. Since 41 is a prime and 23 is not divisible by 41, we have:

23^(41-1) mod 41 = 1

23^40 mod 41 = 1

23^100002 = 23^(40*2500 + 2)

Using the property (a^b * a^c) mod m = (a^(b+c)) mod m, we can simplify this to

23^100002 = (23^40)^2500 * 23^2

Taking both sides of the equation mod 41, we get:

23^100002 mod 41 = (23^40 mod 41)^2500 * 23^2 mod 41

23^100002 mod 41 = 23^2 mod 41 = 18

Therefore, 23^100002 mod 41 = 18.

b. To find 43^123456 mod 73, we can use the method of repeated squaring. We first write the exponent in binary form:

123456 = 11110001001000000

Starting with the base 43, we repeatedly square and take modulo 73, using the binary digits as a guide. For example, we have:

43^2 mod 73 = 15

43^4 mod 73 = 15^2 mod 73 = 56

43^8 mod 73 = 56^2 mod 73 = 27

43^16 mod 73 = 27^2 mod 73 = 28

43^32 mod 73 = 28^2 mod 73 = 12

43^64 mod 73 = 12^2 mod 73 = 16

43^128 mod 73 = 16^2 mod 73 = 19

43^256 mod 73 = 19^2 mod 73 = 55

43^512 mod 73 = 55^2 mod 73 = 42

43^1024 mod 73 = 42^2 mod 73 = 35

43^2048 mod 73 = 35^2 mod 73 = 71

43^4096 mod 73 = 71^2 mod 73 = 34

43^8192 mod 73 = 34^2 mod 73 = 43

Therefore, 43^123456 mod 73 = 43^8192 mod 73 = 43.

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Calculating the value of cot(π/5) and simplifying the expression, we can find the area of the pentagon.

To determine the next two digits for the given sequence, we can analyze the pattern and identify any recurring sequence or relationship among the numbers.

Looking at the given sequence 434363358, we can observe the following pattern:

The first digit (4) is repeated.

The second digit (3) is repeated twice.

The third digit (4) is repeated once.

The fourth digit (6) is repeated three times.

The fifth digit (3) is repeated once.

The sixth digit (5) is repeated twice.

The seventh digit (8) is repeated once.

Based on this pattern, the next two digits are likely to be 35.

Now, assuming the first missing digit represents the length of a side and the second missing digit represents the number of sides of a regular polygon, we have a regular polygon with a side length of 3 and 5 sides (a pentagon).

To calculate the area of a regular polygon, we can use the formula:

Area = (1/4) * n * s^2 * cot(π/n)

where n is the number of sides and s is the length of a side.

Substituting the values, we have:

Area = (1/4) * 5 * 3^2 * cot(π/5)

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The value of cosec A / cot A - sec A, we'll first express cosec A, cot A, and sec A in terms of the given value of tan A.The value of cosec A / cot A - sec A, using the given value of tan A = 4/3, is 1 + √(9/7)/3.

We know that cosec A is the reciprocal of sin A, and sin A is the reciprocal of cosec A. Similarly, cot A is the reciprocal of tan A, and sec A is the reciprocal of cos A.

Using the Pythagorean identity, sin^2 A + cos^2 A = 1, we can find the value of cos A. Since tan A = 4/3, we can find sin A as well.

Given:

tan A = 4/3

Using the Pythagorean identity:

sin^2 A + cos^2 A = 1

We can solve for cos A as follows:

(4/3)^2 + cos^2 A = 1

16/9 + cos^2 A = 1

cos^2 A = 1 - 16/9

cos^2 A = 9/9 - 16/9

cos^2 A = -7/9

Taking the square root of both sides, we get:

cos A = ± √(-7/9)

Since cos A is positive in the first and fourth quadrants, we take the positive square root:

cos A = √(-7/9)

Now, using the definitions of cosec A, cot A, and sec A, we can find their values:

cosec A = 1/sin A

cot A = 1/tan A

sec A = 1/cos A

Substituting the values we found:

cosec A = 1/sin A = 1/√(1 - cos^2 A) = 1/√(1 - (-7/9)) = 1/√(16/9) = 1/(4/3) = 3/4

cot A = 1/tan A = 1/(4/3) = 3/4

sec A = 1/cos A = 1/√(-7/9) = -√(9/7)/3

Now, let's calculate the expression cosec A / cot A - sec A:

cosec A / cot A - sec A = (3/4) / (3/4) - (-√(9/7)/3)

= 1 - (-√(9/7)/3)

= 1 + √(9/7)/3

Therefore, the value of cosec A / cot A - sec A, using the given value of tan A = 4/3, is 1 + √(9/7)/3.

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The value of angle S is 53°

Exterior angle theorem states that the measure of an exterior angle of a triangle is equal to the sum of two remote interior angles.

With this theorem we can say that

7x+2 = 4x+13+19

collecting like terms

7x -4x = 13+19-2

3x = 30

divide both sides by 3

x = 30/3

x = 10

Since x = 10

angle S = 4x+13

angle S = 4(10) +13

= 40+13

= 53°

Therefore the measure of angle S is 53°

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Answer:

It would be H.

Explanation:
I'm good at math

The general solution of the given differential equation is:

[tex]\[ y(x) = C_1e^{-\frac{x}{4}}\sin\left(\frac{\sqrt{15}x}{4}\right) + C_2e^{-\frac{x}{4}}\cos\left(\frac{\sqrt{15}x}{4}\right) \][/tex]

where [tex]\( C_1 \)[/tex] and [tex]\( C_2 \)[/tex] are constants of integration.

To solve the given differential equation, we follow these steps:

⇒ Write the differential equation

[tex]\[ 16y'' + 8y + y = 0 \][/tex]

⇒ Assume a solution of the form [tex]\( y(x) = e^{mx} \)[/tex]

⇒ Calculate the derivatives of [tex]\( y \)[/tex]

[tex]\[ y' = me^{mx}, \quad y'' = m^2e^{mx} \][/tex]

⇒ Substitute the derivatives into the differential equation

[tex]\[ 16m^2e^{mx} + 8e^{mx} + e^{mx} = 0 \][/tex]

⇒ Factor out the common term [tex]\( e^{mx} \)[/tex]

[tex]\[ e^{mx}(16m^2 + 8m + 1) = 0 \][/tex]

⇒ Solve the quadratic equation [tex]\( 16m^2 + 8m + 1 = 0 \)[/tex] to find the roots

Using the quadratic formula, we have

[tex]\[ m = \frac{{-8 \pm \sqrt{8^2 - 4(16)(1)}}}{{2(16)}} = \frac{{-1 \pm \sqrt{15}i}}{4} \][/tex]

⇒ Express the roots in exponential form

[tex]\[ m_1 = \frac{1}{4}e^{i\frac{\pi}{3}}, \quad m_2 = \frac{1}{4}e^{-i\frac{\pi}{3}} \][/tex]

⇒ Write the general solution using the exponential form of the roots

[tex]\[ y(x) = C_1e^{m_1x} + C_2e^{m_2x} \][/tex]

⇒ Substitute the exponential forms of [tex]\( m_1 \)[/tex] and [tex]\( m_2 \)[/tex] into the general solution

[tex]\[ y(x) = C_1e^{-\frac{x}{4}}\sin\left(\frac{\sqrt{15}x}{4}\right) + C_2e^{-\frac{x}{4}}\cos\left(\frac{\sqrt{15}x}{4}\right) \][/tex]

Hence, the complete solution to the differential equation [tex]\( 16y'' + 8y + y = 0 \)[/tex] is given by

[tex]\[ y(x) = C_1e^{-\frac{x}{4}}\sin\left(\frac{\sqrt{15}x}{4}\right) + C_2e^{-\frac{x}{4}}\cos\left(\frac{\sqrt{15}x}{4}\right) \][/tex]

where [tex]\( C_1 \)[/tex] and [tex]\( C_2 \)[/tex] are arbitrary constants.

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To find the general solution of the differential equation 16y" + 8y + y = 0, we can use the characteristic equation method. Let's assume that y(t) can be expressed as a function of t in the form of [tex]y(t) = e^(rt)[/tex], where r is a constant to be determined.

First, let's find the first and second derivatives of y(t):

[tex]y'(t) = re^(rt)y''(t) = r^2e^(rt)[/tex]

Substituting these derivatives into the differential equation, we have:

[tex]16y'' + 8y + y = 16(r^2e^(rt)) + 8e^(rt) + e^(rt) = 0[/tex]

Factoring out [tex]e^(rt),[/tex]we get:

[tex]e^(rt)(16r^2 + 8r + 1) = 0[/tex]

For this equation to hold true for all t, the coefficient of [tex]e^(rt)[/tex] must be zero:

[tex]16r^2 + 8r + 1 = 0[/tex]

We can solve this quadratic equation by factoring, completing the square, or using the quadratic formula. In this case, it is simpler to use the quadratic formula:

[tex]r = (-8 ± sqrt(8^2 - 4 * 16 * 1)) / (2 * 16)r = (-8 ± sqrt(64 - 64)) / 32r = (-8 ± 0) / 32r = -1/4[/tex]

We obtain a repeated root, [tex]r = -1/4.[/tex]

Thus, the general solution of the differential equation is:

[tex]y(t) = C1e^(-t/4) + C2te^(-t/4)[/tex]

Where C1 and C2 are arbitrary constants of integration.

In this form, we have expressed the general solution of the given differential equation. The term [tex]C1e^(-t/4)[/tex] represents the contribution of the first constant, while the term [tex]C2te^(-t/4)[/tex]accounts for the second constant and the linear factor t.

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The quotient is approximately 0.926.

To find the quotient of 3³ divided by 3.2, we need to divide 3³ by 3.2.

First, let's calculate 3³, which means multiplying 3 by itself three times.

3³ = 3 * 3 * 3 = 27.

Next, we divide 27 by 3.2.

27 ÷ 3.2 = 8.4375.

Since the question asks for the quotient to be rounded to a reasonable decimal place, we can approximate the quotient to 0.926.

Therefore, the quotient of 3³ divided by 3.2 is approximately 0.926.

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The relative frequency of deaths in a specific population is referred to as the mortality rate.

The mortality rate is a key measure used to understand the level of fatalities within a population. It represents the number of deaths per unit of population over a specific period typically expressed as deaths per 1,000 or 100,000 individuals.

The mortality rate provides valuable insights into the health and well-being of a population and is widely used in public health, epidemiology, and demographic studies. By monitoring changes in the mortality rate over time, researchers and policymakers can identify trends, assess the impact of interventions, and develop strategies to improve population health outcomes.

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a)  The time complexity of the algorithm is at least O(m), which is not polynomial. b) The  LCM is in P.

(a) The given algorithm does not run in polynomial time because the loop from i = 1 to m - 1 has a time complexity of O(m). In the worst case scenario, the value of m could be very large, leading to a large number of iterations in the loop.

As a result, the time complexity of the algorithm is at least O(m), which is not polynomial.

(b) To prove that LCM is in P, we need to show that there exists a polynomial-time algorithm that decides LCM.

One efficient approach to finding the least common multiple is to use the formula lcm(a, b) = |a * b| / gcd(a, b), where gcd(a, b) represents the greatest common divisor of a and b.

The algorithm for LCM can be summarized as follows:

1. Compute gcd(a, b) using an efficient algorithm such as Euclid's algorithm, which has a polynomial time complexity.

2. Compute lcm(a, b) using the formula lcm(a, b) = |a * b| / gcd(a, b).

3. Check if the computed lcm(a, b) is equal to m. If it is, accept a, b, m; otherwise, reject them.

This algorithm runs in polynomial time since both the computation of gcd(a, b) and the subsequent calculation of lcm(a, b) can be done in polynomial time. Therefore, LCM is in P.

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Answer:

Radius is [tex]r\approx4.622\,\text{ft}[/tex]

Step-by-step explanation:

[tex]V=\pi r^2h\\34=\pi r^2(5)\\\frac{34}{5\pi}=r^2\\r=\sqrt{\frac{34}{5\pi}}\\r\approx4.622\,\text{ft}[/tex]

The solutions to the equation |2y-3|=12 are y=7.5 and y=-4.5.

To solve the equation |2y-3|=12, we need to eliminate the absolute value by considering both the positive and negative cases.

In the positive case, we have 2y-3=12. Adding 3 to both sides gives us 2y=15, and dividing by 2 yields y=7.5.

In the negative case, we have -(2y-3)=12. Distributing the negative sign gives -2y+3=12. Subtracting 3 from both sides gives -2y=9, and dividing by -2 yields y=-4.5.

Therefore, the possible solutions are y=7.5 and y=-4.5. To verify these solutions, we substitute them back into the original equation.

For y=7.5, we have |2(7.5)-3|=12. Simplifying, we get |15-3|=12, which is true since the absolute value of 15-3 is 12.

For y=-4.5, we have |2(-4.5)-3|=12. Simplifying, we get |-9-3|=12, which is also true since the absolute value of -9-3 is 12.

Hence, both solutions satisfy the original equation, confirming that y=7.5 and y=-4.5 are the correct solutions.

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The value of slope m  is -5 and y-intercept b is 2. Thus, option D is correct

The equation of a line in slope-intercept form is given by y = mx + b, where m is the slope of the line and b is the y-intercept. The slope of a line can be found using the formula m = (rise)/(run), which can be calculated using two given points.

The two given points are (2, 12) and (-1, -3). To find the rise and run of the line, we subtract the y-coordinates and x-coordinates, respectively. Therefore, the rise is (12 - (-3)) = 15, and the run is (2 - (-1)) = 3.

Using the rise and run values, we can find the slope of the line as follows:

m = (rise)/(run) = 15/3 = 5

Now that we know the slope is 5, we can use the point-slope form of the equation of a line to find the value of b. Using (2, 12) as a point on the line and m = 5, we have:

y - 12 = 5(x - 2)

Simplifying this equation:

y - 12 = 5x - 10

Adding 12 to both sides:

y = 5x + 2

Comparing this equation to the slope-intercept form, y = mx + b, we can see that b = 2. Therefore, the values of m and b are:

m = 5 and b = 2

Therefore, the answer is option D: m = -5, b = 2.

Note: The slope of a line can also be calculated using any other point on the line.

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Given `f(x) = x^2 - 3x + 2`, we are supposed to find the value(s) for `x` such that

`f(x) = 20`.

Therefore,`

x^2 - 3x + 2 = 20`

Moving `20` to the left-hand side of the equation:

`x^2 - 3x + 2 - 20 = 0`

Simplifying the above equation:`

x^2 - 3x - 18 = 0`

We will now use the quadratic formula to solve for `x`.

`a = 1`, `b = -3` and `c = -18`.

Quadratic formula: `

x = (-b ± sqrt(b^2 - 4ac)) / 2a`

Substituting the values of `a`, `b` and `c` in the quadratic formula, we get:`

x = (-(-3) ± sqrt((-3)^2 - 4(1)(-18))) / 2(1)`

Simplifying the above equation:

`x = (3 ± sqrt(9 + 72)) / 2`

=`(3 ± sqrt(81)) / 2`

=`(3 ± 9) / 2`

Therefore, `x = -3` or `x = 6`.

Hence, the solution set is `{-3, 6}`.

Answer: `{-3, 6}`.

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Statement                                  | Reason

----------------------------------------------------------

1. ΔQTS ≅ ΔXWZ                           | Given

2. TR bisects ∠QTS                       | Given

3. WY bisects ∠XWZ                       | Given

4. ∠QTS ≅ ∠XWZ                           | Corresponding parts of congruent triangles are congruent (CPCTC)

5. ∠QTR ≅ ∠XWY                           | Angle bisectors divide angles into congruent angles

6. ΔQTR ≅ ΔXWY                           | Angle-Angle (AA) criterion for triangle congruence

7. TR ≅ WY                                | Corresponding parts of congruent triangles are congruent (CPCTC)

8. TR/WY = QT/XW                          | Division property of equality

In the given statement, it is stated that triangle QTS is congruent to triangle XWZ (ΔQTS ≅ ΔXWZ).

The given information also states that TR is an angle bisector of angle QTS, and step 3 states that WY is an angle bisector of angle XWZ.

Based on the congruence of triangles QTS and XWZ (ΔQTS ≅ ΔXWZ), we can conclude that the corresponding angles in these triangles are congruent. Therefore, ∠QTS ≅ ∠XWZ.

Because TR is an angle bisector of ∠QTS and WY is an angle bisector of ∠XWZ, they divide the respective angles into congruent angles. Thus, ∠QTR ≅ ∠XWY.

Using the Angle-Angle (AA) criterion for triangle congruence, we can conclude that triangles QTR and XWY are congruent (ΔQTR ≅ ΔXWY).

By the Corresponding Parts of Congruent Triangles are Congruent (CPCTC) property, we know that corresponding sides of congruent triangles are congruent. Therefore, TR ≅ WY.

Finally, using the Division Property of Equality, we can divide both sides of the equation TR ≅ WY by the corresponding sides QT and XW to obtain the desired result, TR/WY = QT/XW.

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The expression equivalent to y is x^2 - 2x - 14. Thus, option 3 is correct.

Consider the equation: (x+2)^2 = 6(x+3) + y.

To find the expression equivalent to y, first expand the binomial on the left side: (x+2)^2 = x^2 + 4x + 4.

Substituting this result into the original equation and simplifying:

x^2 + 4x + 4 = 6x + 18 + y.

Rearranging the equation:

x^2 - 2x - 14 = y.

Thus, the expression equivalent to y is x^2 - 2x - 14. Therefore, the correct option is 3.) x^2 - 2x - 14.

When solving equations, it's important to isolate the variable on one side of the equation by performing operations on both sides. Pay attention to the order of operations and use algebraic properties to simplify expressions and rearrange terms.

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The dimensions of the cardboard for which the volume of the boxes produced by both methods will be the same are width = 26 in and length = 27 in.

(c)The method to solve the system is to equate the volume of the boxes obtained by the two methods since they are both the same.

We are given that a manufacturer is making cardboard boxes by cutting out four equal squares from the corners of the rectangular piece of cardboard and then folding the remaining part into a box. The length of the cardboard piece is 1 in. longer than its width. The manufacturer can cut out either 3 × 3 in. squares, or 4 × 4 in. squares.

We have to find the dimensions of the cardboard for which the volume of the boxes produced by both methods will be the same. Let the width of the cardboard be x in. Then the length of the cardboard is (x + 1) in. The box obtained by cutting out 4 squares of side 3 in. from the cardboard will have:

length (x - 2) in, width (x - 2 - 3 - 3) in = (x - 8) in, and height 3 in.

Volume of the box obtained by cutting out 4 squares of side 3 in. from the cardboard is given by:

V1 = length × width × height= (x - 2) × (x - 8) × 3 in³= 3(x - 2)(x - 8) in³

The box obtained by cutting out 4 squares of side 4 in. from the cardboard will have:

length (x - 2) in, width (x - 2 - 4 - 4) in = (x - 12) in, and height 4 in.

Volume of the box obtained by cutting out 4 squares of side 4 in. from the cardboard is given by:

V2 = length × width × height = (x - 2) × (x - 12) × 4 in³= 4(x - 2)(x - 12) in³

As we know

V1 = V2.

Therefore, 3(x - 2)(x - 8) = 4(x - 2)(x - 12)3(x - 2)(x - 8) - 4(x - 2)(x - 12) = 0(x - 2)(3x - 24 - 4x + 48) = 0(x - 2)(- x + 26) = 0

Therefore, x = 2 or x = 26. x cannot be 2 as the length of the cardboard should be (x + 1) in. which cannot be 3 in.

Therefore, x = 26 in is the width of the cardboard. The length of the cardboard = (x + 1) in.= (26 + 1) in.= 27 in.

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The function f(x) = √(3x - 4) has a domain of x ≥ 4/3 and a range of y ≥ 0. The inverse function, f⁻¹(x) = ([tex]x^{2}[/tex] + 4)/3, has a domain of all real numbers and a range of f⁻¹(x) ≥ 4/3. The inverse function is a valid function.

The given function f(x) = √(3x - 4) has a square root of the expression 3x - 4. To ensure a real result, the expression inside the square root must be non-negative. By solving 3x - 4 ≥ 0, we find that x ≥ 4/3, which determines the domain of f(x).

The range of f(x) consists of all real numbers greater than or equal to zero since the square root of a non-negative number is non-negative or zero.

To find the inverse function f⁻¹(x), we follow the steps of swapping variables and solving for y. The resulting inverse function is f⁻¹(x) = ([tex]x^{2}[/tex] + 4)/3. The domain of f⁻¹(x) is all real numbers since there are no restrictions on the input.

The range of f⁻¹(x) is determined by the graph of the quadratic function ([tex]x^{2}[/tex] + 4)/3. Since the leading coefficient is positive, the parabola opens upward, and the minimum value occurs at the vertex, which is f⁻¹(0) = 4/3. Therefore, the range of f⁻¹(x) is f⁻¹(x) ≥ 4/3.

As both the domain and range of f⁻¹(x) are valid and there are no horizontal lines intersecting the graph of f(x) at more than one point, we can conclude that f⁻¹(x) is a function.

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The time required for the body to reach a temperature of 100 degree Farenheit is 7.5 minutes

From the given information, we know:

T₀ = 50°F

Tₒ = 150°F

Temperature =  75°F(after 10 minutes)

Newton's law of cooling is expressed as;

ΔT/Δt = -k(T - Tₒ)

Substitute the values, we have;

(75 - 150)/(10 - 0) = -k(75 - 150)

expand the bracket

-75/10 = -k(-75)

Multiply the values

7.5k = 1

Now, we can determine the proportionality constant k.

Next, we can use the equation to find the time required for the body to reach 100°F:

(100 - 150)/(t - 0) = -k(100 - 150)

-50/t = -k(-50)

k = 1/t (Equation 2)

Substitute the values, we get;

7.5/t = 1

cross multiply the values

t = 7.5 minutes

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The time required for the body to reach a temperature of 100 degree Farenheit is 7.5 minutes

How to determine the time

From the given information, we know:

T₀ = 50°F

Tₒ = 150°F

Temperature =  75°F(after 10 minutes)

Newton's law of cooling is expressed as;

ΔT/Δt = -k(T - Tₒ)

Substitute the values, we have;

(75 - 150)/(10 - 0) = -k(75 - 150)

expand the bracket

-75/10 = -k(-75)

Multiply the values

7.5k = 1

Now, we can determine the proportionality constant k.

Next, we can use the equation to find the time required for the body to reach 100°F:

(100 - 150)/(t - 0) = -k(100 - 150)

-50/t = -k(-50)

k = 1/t (Equation 2)

Substitute the values, we get;

7.5/t = 1

cross multiply the values

t = 7.5 minutes

So, The time required for the body to reach a temperature of 100 degree Farenheit is 7.5 minutes

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To convert a decimal to a percent, you multiply by 100 and add the percent symbol (%), and to convert a percent to a decimal, you divide by 100.

To convert a decimal to a percent, you can multiply the decimal by 100 and add a percent symbol (%).

For example, to convert 0.46 to a percent:
0.46 x 100 = 46%

So, 0.46 can be written as 46%.

To convert a percent to a decimal, you can divide the percent by 100.

For example, to convert 46% to a decimal:
46% ÷ 100 = 0.46

So, 46% can be written as 0.46.

In summary, to convert a decimal to a percent, you multiply by 100 and add the percent symbol (%), and to convert a percent to a decimal, you divide by 100.

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