The sum of three consecutive odd integers is forty five written as an algebraic equation would be:
x + (x+1) + (x+3) = 45
True or False

Answer: A cosine function would be a simpler model for the situation.

The minimum depth (low tide) occurs at

t = 0. A reflection of the cosine curve also has a minimum at t = 0.

A sine model would require a phase shift, while a cosine model does not.

Step-by-step explanation:

Using a cosine function is simpler to model the tide changes because it starts at the maximum value, aligning with the high tide occurrence.

The depth of the water at the end of a pier changes periodically due to tides. Given that low tides occur at 12:00 am and 12:30 pm with a depth of 2.5 m, and high tides occur at 6:15 am and 6:45 pm with a depth of 5.5 m, we need to model this situation with a periodic function.

Let's align this with a cosine function for simplicity. In general, the cosine function can be modeled as y = A cos(B(t - C)) + D, where:

Therefore, the function becomes: y(t) = 1.5 cos((2π/747.5)(t - 375)) + 4. Using a cosine function is simpler because it starts at the maximum value, which corresponds to the high tide.

The maximum value of the function y = 3 cos x will be 3.

The minimum value of the function y = 3 cos x will be - 3.

Mathematical expression is defined as the collection of the numbers variables and functions by using operations like addition, subtraction, multiplication, and division.

Given that;

The function is,

⇒ y = 3 cos x

In the interval [-2π, 2π].

Now,

Since, The function is,

⇒ y = 3 cos x

Hence, We get;

The maximum value of the function y = 3 cos x is,

⇒ y = 3 cos2π

⇒ y = 3 × 1

⇒ y = 3

And, The minimum value of the function y = 3 cos x is,

⇒ y = 3 cos(-2π)

⇒ y = 3 × - 1

⇒ y = - 3

Thus, The maximum value of the function = 3.

The minimum value of the function = - 3.

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 {(3, 5), (–4, 5), (–5, 0), (1, 1), (4, 0)}

As long as there are the same x-value does not have multiple y-value results, it will be a function. This data array doesn't contain any recurring x-values. Therefore, this is a function (in simple terms of speaking).

Answer:

- 6 is the extraneous solution.

Step-by-step explanation:

Given : [tex]\sqrt{-3x -2} = x + 2[/tex].

To find : Which of the following is an extraneous solution .

Solution : We have given that [tex]\sqrt{-3x -2} = x + 2[/tex].

Taking square both sides

-3x - 2 = [tex](x+2)^{2}[/tex].

On applying identity  [tex](a+b)^{2}[/tex] = a² + b² + 2ab

Then ,

-3x -2 =  x² + 2² + 2 * 2 *x

-3x -2 =  x² + 4 + 4x.

On adding both sides by 3x

-2 =  x² + 4 + 4x + 3x

-2 =  x² + 4 + 7x

On adding both sides by 2

0 =  x² + 4 + 7x + 2

On switching sides

x² +7x + 6 = 0

On Factoring

x² +6x + x + 6 = 0

x ( x+ 6 ) +1 (x +6 ) = 0

On grouping

( x +1) ( x +6) = 0

x = -1, -6.

Let check for x = -6

[tex]\sqrt{-3 (-6) -2} = -6 + 2[/tex].

4 =  -4

An extraneous solution is a root of a transformed equation that is not a root of the original equation.

Therefore,  -6 is the extraneous solution.

-36 is the correct answer

Ordered pairs that are solutions to the equation x-4y=4 is (4, 0) and (0, -1).

The given equation is x-4y=4.

We need to find an ordered pair that is a solution to the equation.

The solutions of linear equations are the points at which the lines or planes representing the linear equations intersect or meet each other. A solution set of a system of linear equations is the set of values to the variables of all possible solutions.

From the graph, we can observe that (4, 0) and (0, -1) are solutions.

Verification of the solution (4, 0):

4-4y=4

⇒-4y=0

⇒y=0

Verification of the solution (0, -1):

0-4y=4

⇒-4y=4

⇒y=-1

Therefore, ordered pairs that are solutions to the equation x-4y=4 is (4, 0) and (0, -1).

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Answer:

Its B I just took the test

Answer:

he XY is dilated by a scale factor of 1.3 with the origin as the center of dilation to create the X'Y'. So the length of X'Y' is 1.3 times of origin but the slope is the same. The slope is m

Step-by-step explanation:

Using linear functions, it is found that the store must sell 40 bicycles each month to break even.

A linear function is modeled by:

y = mx + b

In which:

A bicycle store costs $2400 per month to operate, and pays an average of $60 per bike, hence the cost function is given by:

C(x) = 2400 + 60x

The average selling price of each bicycle is $120, hence the revenue function is given by:

R(x) = 120x

It breaks even when cost equals revenue, hence:

R(x) = C(x)

120x = 2400 + 60x

60x = 2400

x = 240/6

x = 40.

The store must sell 40 bicycles each month to break even.

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To determine the number of bicycles the store must sell each month to break even, we can set up a system of equations. The store must sell 40 bicycles each month to break even.

To determine the number of bicycles the store must sell each month to break even, we can set up a system of equations.

Let's say the number of bicycles sold per month is x.

The monthly operating cost of the store is $2400.

The cost of producing each bike is $60, so the total cost to produce x bikes would be $60x.

The average selling price of each bike is $120, so the total revenue from selling x bikes would be $120x.

To break even, the total revenue should equal the total cost, so we can set up the equation:

$120x = $60x + $2400

Simplifying the equation, we get:

$60x = $2400

Dividing both sides by $60, we find:

x = 40

Therefore, the store must sell 40 bicycles each month to break even.

The functions for House 1 and House 2 are [tex]\(f_1(x) = 5079.6x + 248900.4\)[/tex] and [tex]\(f_2(x) = 4666.\overline{66}x + 256000\)[/tex] respectively.

After 45 years, House 1 will be valued at $477,555, and House 2 will be valued at $465,000.

Here's the step-by-step solution with complete calculations for the given problem:

Part A: Identifying the Function Type

- House 1:

 - Year 1 to Year 2: [tex]\(259,059.60 - 253,980 = 5,079.60\)[/tex]

 - Year 2 to Year 3: [tex]\(264,240.79 - 259,059.60 = 5,181.19\)[/tex]

- House 2:

 - Year 1 to Year 2: [tex]\(263,000 - 256,000 = 7,000\)[/tex]

 - Year 2 to Year 3: [tex]\(270,000 - 263,000 = 7,000\)[/tex]

The functions are linear because the changes are constant for House 2 and almost constant for House 1.

Part B: Formulating the Equations

- House 1 Equation:

 - Slope (m): [tex]\(5079.6\)[/tex]

 - Y-intercept (c): [tex]\(248900.4\)[/tex]

 - Equation: [tex]\(f_1(x) = 5079.6x + 248900.4\)[/tex]

- House 2 Equation:

 - Slope (m): [tex]\(4666.\overline{66}\)[/tex]

 - Y-intercept (c): [tex]\(256000\)[/tex]

 - Equation: [tex]\(f_2(x) = 4666.\overline{66}x + 256000\)[/tex]

Part C: Calculating Future Values

- House 1 Value at Year 45:

[tex]- \(f_1(45) = 5079.6 \times 45 + 248900.4 = 477555\)[/tex]

- House 2 Value at Year 45:

[tex]- \(f_2(45) = 4666.\overline{66} \times 45 + 256000 = 465000\)[/tex]

These equations predict the values of the houses after 45 years based on the given data. House 1 will be valued at $477,555, and House 2 will be valued at $465,000.

A= apple pie

B = blueberry pie

a+b=38

a=38-b

11a + 13b =460

11(38-b) + 13b = 460

418-11b +13b = 460

2b=42

b=42/2 =21

they sold 21 blueberry pies and 17 apple pies

Answer:

42.06

Step-by-step explanation:

Two points (22,27) and (2,-10)

using distance formula:

[tex]d=\sqrt{(x_2-x_1)^2+(y_2-y_1)^2}[/tex]

So, distance between (22,27) and (2,-10) is D

[tex]D=\sqrt{(22-2)^2+(27-(-10))^2}[/tex]

[tex]D=\sqrt{(20)^2+(37)^2}[/tex]

[tex]D=\sqrt{400+1369}[/tex]

[tex]D=\sqrt{1769}[/tex]

[tex]D=42.059[/tex]

Round off two decimal place.

[tex]D=42.06[/tex]

Hence, The distance between the points is 42.06

Answer:

The system of equations is

[tex]x+y=15[/tex]

[tex]19x+8y=164[/tex]

Step-by-step explanation:

Let

x------> the number of videos of new releases

y-----> the number of classics videos

we know that

[tex]x+y=15[/tex] ------> equation A

[tex]19x+8y=164[/tex] ------> equation B

Using a graphing tool

Solve the system of equations

Remember that the solution of the system of equations is the intersection point both graphs

The intersection point is [tex](4,11)[/tex]

see the attached figure

therefore

the number of videos of new releases is [tex]4[/tex]

the number of classics videos is [tex]11[/tex]

Answer:

Jerome bought 15 videos from a department store. Some videos were new releases, x,  which cost $19, and some videos were classics, y, which cost $8. He spent a total of $164 on the videos. Which system of equations is set up correctly to model this information?

x + y = 15. 19 x + 8 y = 164.

x + y = 15. 8 x + 19 y = 164.

x + y = 164. 19 x + 8 y = 15.

x + y = 15. 19 x minus 8 y = 164.

ANSWER IS A

The solution of the given quadratic equation will be ( -5, 0 ).

The polynomial having a degree of two or the maximum power of the variable in a polynomial will be 2 is defined as the quadratic equation and it will cut two intercepts on the graph at the x-axis.

Given equation is:-

x²  =   -5x

x²  +   5x  =  0

x  (  x + 5 ) = 0

x  =  0   and   x  =  -5

Therefore the solution of the given quadratic equation will be ( -5, 0 ).

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The solutions to the quadratic equation [tex]\(x^2 = -5x - 3\)[/tex] can be calculated after modifying the quadratic equation and rewriting it to [tex]x^{2} + 5x + 3 = 0[/tex], and then this can be calculated using the quadratic formula. The solutions are x =[tex]\frac{{-5 + \sqrt{13}}}{2}[/tex]and x =[tex]\frac{{-5 - \sqrt{13}}}{2}[/tex] .

To find the solutions to the quadratic equation [tex]\(x^2 = -5x - 3\)[/tex], let's first rewrite it in the standard form:

[tex]\[x^2 + 5x + 3 = 0\][/tex]

Now, we can use the quadratic formula to find the solutions:

[tex]\[x = \frac{{-b \pm \sqrt{{b^2 - 4ac}}}}{{2a}}\][/tex]

Where a = 1,,b = 5, and c=3.

[tex]\[x = \frac{{-5 \pm \sqrt{{5^2 - 4 \cdot 1 \cdot 3}}}}{{2 \cdot 1}}\][/tex]

[tex]\[x = \frac{{-5 \pm \sqrt{{25 - 12}}}}{2}\][/tex]

[tex]\[x = \frac{{-5 \pm \sqrt{13}}}{2}\][/tex]

So, the solutions are:

x =[tex]\frac{{-5 + \sqrt{13}}}{2}[/tex] and [x = [tex]\frac{{-5 - \sqrt{13}}}{2}[/tex]

Answer:

Option (d) is correct.

The area of triangle is 38.5 square units

Step-by-step explanation:

 Given: An obtuse triangle.

We have to find the area of this obtuse angle.

Consider the given obtuse triangle

Area of triangle = [tex]\frac{1}{2}\cdot b \cdot h[/tex]

where b = Base

h = height

Given : base = 11  units

and height = 7 units

Thus, Area of triangle = [tex]\frac{1}{2}\cdot 11 \cdot 7[/tex]

Simplify, we have,

Area of triangle = 38.5

Thus, The area of triangle is 38.5 square units

Final answer:

To find the area of the Mona Lisa in square centimeters, multiply the width and height in inches, then convert to square centimeters using the conversion factor. The area is approximately 4098.97 square centimeters.

Explanation:

To calculate the area of Leonardo da Vinci's Mona Lisa in square centimeters, we start with the given measurements in inches: the painting is 21 inches wide and 30.25 inches tall. Since the area is width multiplied by height, we perform the following calculation:

Area in square inches = width in inches × height in inches

Area in square inches = 21 × 30.25

Area in square inches = 635.25

To convert square inches to square centimeters, we use the conversion factor where 1 square inch = 6.4516 square centimeters.

Area in square centimeters = Area in square inches × 6.4516

Area in square centimeters = 635.25 × 6.4516

Area in square centimeters = 4098.97

Therefore, the area of the Mona Lisa is approximately 4098.97 square centimeters.

multiply 80 by 1.5

80*1.5 = 120 feet

total = 2372* (1+0.045)^20=

2372*1.045^20=

2372 * 2.411714025= 5720.585

she will have 5720.59 in 20 years