The table shows the weekly change in the water level in a swimming pool. After 4 weeks, the pool owner adds water to return the water level back to the original level. Raising the water level by 1 inch requires 320 gallons. The water hose has a flow rate of 5.75 gallons of water per minute. Will it take less than an hour to fill the pool back to return the water level to the original level? Explain your reasoning.

Week: 1 2 3 4
Change (in.) : - 1/2 3/4 -1 1/8 -1 3/8

Answer:

[tex]x_{1,2}=\frac{-(-2)\pm\sqrt{(-2)^2-4\cdot (-3)\cdot 6} }{2(-3)}[/tex] shows correct substitution of the values a, b, and c  from the given quadratic equation  [tex]-3x^2-2x+6=0[/tex]  into quadratic formula.

Step-by-step explanation:

Given: The quadratic equation [tex]-3x^2-2x+6=0[/tex]

We have to show the correct substitution of the values a, b, and c from the given quadratic equation  [tex]-3x^2-2x+6=0[/tex]  into quadratic formula.

The standard form of quadratic equation is [tex]ax^2+bx+c=0[/tex] then the solution of quadratic equation using quadratic formula is given as [tex]x_{1,2}=\frac{-b\pm\sqrt{b^2-4ac} }{2a}[/tex]

Consider the given  quadratic equation [tex]-3x^2-2x+6=0[/tex]

Comparing with general  quadratic equation, we have

a = -3 , b = -2 , c = 6

Substitute in quadratic formula, we get,

[tex]x_{1,2}=\frac{-(-2)\pm\sqrt{(-2)^2-4\cdot (-3)\cdot 6} }{2(-3)}[/tex]

Simplify, we have,

[tex]x_{1,2}=\frac{2\pm\sqrt{76} }{-6}[/tex]

Thus, [tex]x_{1}=\frac{2+\sqrt{76} }{-6}[/tex] and x_{2}=\frac{2-\sqrt{76} }{-6}

Simplify, we get,

[tex]x_1=-\frac{1+\sqrt{19}}{3},\:x_2=\frac{\sqrt{19}-1}{3}[/tex]

Thus, [tex]x_{1,2}=\frac{-(-2)\pm\sqrt{(-2)^2-4\cdot (-3)\cdot 6} }{2(-3)}[/tex] shows correct substitution of the values a, b, and c  from the given quadratic equation  [tex]-3x^2-2x+6=0[/tex]  into quadratic formula.

You can use the standard form of quadratic equation to find the correct substitution of the values a, b and c.

The correct substitution of the value a,b and c from the given quadratic equations into the solution form is [tex]x = \dfrac{-(-2) \pm \sqrt{(-2)^2 - 4 \times -3 \times 6}}{2 \times (-3)}[/tex]

The standard form of quadratic equations is [tex]ax^2 + bx + c = 0[/tex]

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

From given equation [tex]0 = -3x^2 -2x + 6[/tex], we deduce that a = -3, b = -2 and c = 6.

Thus, substituting these values in the solutions' equation:

[tex]x = \dfrac{-b \pm \sqrt{b^2 - 4ac}}{2a}\\ \\ x = \dfrac{2 \pm \sqrt{4 + 72}}{-6} = \dfrac{2\pm 2\sqrt{19}}{-6} = \dfrac{-1 \mp 2\sqrt{19}}{3}[/tex]

Thus, the correct substitution of the value a,b and c from the given quadratic equations into the solution form is [tex]x = \dfrac{-(-2) \pm \sqrt{(-2)^2 - 4 \times -3 \times 6}}{2 \times (-3)}[/tex]

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Answer:

h(x)=  3x - 6

Step-by-step explanation:

Edge 2020

The inverse of function f(x) =  [tex]\frac{1}{3}x + 2[/tex]  is -

y = 3(x - 2)

We have a function - f(x) = [tex]\frac{1}{3}x + 2[/tex]

We have to find the inverse of a function.

We say that a function f : A → B is invertible if for every b ∈ B there is exactly one a ∈ A such that f(a) = b.

According to question, we have -

y = f(x) =  [tex]\frac{1}{3}x + 2[/tex]

Replace x with y, to find inverse function f, and compute the resulting equation for x. Exchanging the variables, we get -

x =   [tex]\frac{1}{3}y + 2[/tex]

x - 2 = [tex]\frac{1}{3} y[/tex]

y = 3(x - 2)

Hence, the inverse of function f(x) =  [tex]\frac{1}{3}x + 2[/tex]  is -

y = 3(x - 2)

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a square needs to rotate 90 to coincide with  itself

 but the hexagon would need to rotate 180

the answer is 180 degrees

Answer:

Option B 180° is the right answer.

Step-by-step explanation:

Given is : GHIJ is a square and ABCDEF is a regular hexagon having common centre O.

We know that a square is symmetric at a rotational angle of 90°.

A regular hexagon is symmetric at a rotational angle of 60°.

We will find the LCM of 90 and 60, to know how much to rotate, to get a preimage.

Moreover, a hexagon needs to rotate 180 degrees to coincide with itself.

LCM(60°,90°)=180°.

So, the correct option is B. 180°.

The number of yards that she will need to make 8 uniforms and 15 uniforms will be 96 yards and 180 yards, respectively.

Algebra is the study of abstract symbols, while logic is the manipulation of all those ideas.

The acronym PEMDAS stands for Parenthesis, Exponent, Multiplication, Division, Addition, and Subtraction. This approach is used to answer the problem correctly and completely.

A pattern for 1 uniform uses 12 yards of material. Boleslaw wants to know how many yards are needed for 8 uniforms will be given as,

⇒ 8 x 12

⇒ 96 yards

Chantal wants to know how many yards she will need to make 15 uniforms will be given as,

⇒ 15 x 12

⇒ 180 yards

The number of yards that she will need to make 8 uniforms and 15 uniforms will be 96 yards and 180 yards, respectively.

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first one is 4-5i

second one is 12+18i

The expression (5−2i)−(1+3i) is equal to 4−5i option (d) is correct and the expression  −2i(−9+6i) is equal to 12+18i option (c) is correct.

It is defined as the number which can be written as x+iy where x is the real number or real part of the complex number and y is the imaginary part of the complex number and i is the iota which is nothing but a square root of -1.

It is given that:

(5−2i)−(1+3i)

After using distributive property:

= 5 - 2i - 1 - 3i

= 4 -5i

−2i(−9+6i)

After using distributive property:

= 18i - 12(i)²

= 18i - 12(-1)

= 18i + 12 = 12 + 18i

Thus, the expression (5−2i)−(1+3i) is equal to 4−5i option (d) is correct and the expression  −2i(−9+6i) is equal to 12+18i option (d) is correct.

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The whole container can hold [tex]5\frac{5}{6}[/tex] liters, calculated by setting up a proportion based on the part of the container currently filled with water ([tex]2\frac{1}{3}[/tex]  liters representing 2/5 of the container).

To determine the full capacity of the container, we set up a proportion. Since [tex]2\frac{1}{3}[/tex]  liters represent 2/5 of the container's capacity, we want to find out how much 5/5 (the whole) of the container can hold. To set up the proportion, we have:

(2/5) of the container = [tex]2\frac{1}{3}[/tex]  liters
(5/5) of the container = x liters
Then, we multiply [tex]2\frac{1}{3}[/tex]  liters by 5/2 to solve for x:

x = ([tex]2\frac{1}{3}[/tex] liters) * (5/2)

x = (7/3 liters) * (5/2)

x = 35/6 liters

x =  [tex]5\frac{5}{6}[/tex] liters

So the whole container would hold  [tex]5\frac{5}{6}[/tex] liters.

Answer:

everything except for a quadrilateral

Step-by-step explanation:

Answer:

{y | y > –4}

Step-by-step explanation:

The range of f(x) = (3/4)^x - 4 is (-∞, -4].

The range of the function f(x) = (3/4)^x - 4 can be determined by finding the minimum and maximum values that the function can reach.

Putting it all together, the range of f(x) is (-∞, -4].

Answer: 704 feet

Step-by-step explanation: speed of car is V= 60 miles per hour

First convert the speed from miles per hour to feet per second .

[tex]V=\frac{60\times 5280}{60\times 60} \frac{ft}{s} = 88 \frac{ft}{s}[/tex]

Now Length of tunnel , L= speed of car x time taken

Therefore [tex]L=88\times 8 feet=704 feet[/tex]

We are given a graph of a quadratic function y = f(x) .

We need to find the solution set of the given graph of a quadratic function .

Note: Solution of a function the values of x-coordinates, where graph cut the x-axis.

For the shown graph, we can see that parabola in the graph doesn't cut the x-axis at any point.

It cuts only y-axis.

Because solution of a graph is only the values of x-coordinates, where graph cut the x-axis. Therefore, there would not by any solution of the quadratic function y = f(x).

Answer:

Option B. ∅

Step-by-step explanation:

If a quadratic function f(x) is in the form of f(x) = ax²+bx+c then the solution of the function is the value of x.

If we analyze the graph for f(x) ≤ 0 solution of the function is null because parabola doesn't intercept at x axis.

Therefore there is no solution for the graphed function f(x).

Option B is the answer.

To find the angle of elevation of the sun, set up a right triangle with the height of the tree and the length of the shadow.

To find the angle of elevation of the sun, we need to set up a right triangle with the height of the tree (50 feet), the length of the shadow (60 feet), and the line from the top of the tree to the end of the shadow.

Using the information given, we can apply the tan(angle) = opposite/adjacent formula to find the angle of elevation.

By calculating the inverse tangent of the ratio of the height of the tree to the length of the shadow, we can determine the angle of elevation to be approximately 45 degrees.

The angle of elevation to the nearest degree of the sun is approximately 40 degrees.

To find the angle of elevation to the sun, we can use the tangent function in trigonometry.

Let's denote:

- Height of the tree = h = 50 feet

- Length of the shadow = b = 60 feet

The tangent of the angle of elevation (θ) is given by:

tan(θ) = opposite / adjacent

tan(θ) = h / b

Substitute the given values:

tan(θ) = 50 / 60

tan(θ) = 5 / 6

Now, to find the angle θ, we need to take the arctangent (inverse tangent) of the ratio:

θ = arctan(5/6)

θ ≈ 39.8 degrees

Therefore, the angle of elevation to the nearest degree of the sun is approximately 40 degrees.

The statement that explains whether Julio is correct is: A .Julio is correct because the $45,000 equity in the house is the real asset.

Asset is anything that add value to you or things that are valuable. Example of assets are:

Real asset=House worth-- Mortgage

Real asset=$220,000-$175,000

Real asset=$45,000

Based on the information given we are told the asset was only $45,000 which means that the $45,000 equity in the house is the real asset.

Inconclusion the statement that explains whether Julio is correct is: A .Julio is correct because the $45,000 equity in the house is the real asset.

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To find two numbers a and b whose sum a + b is 0 and whose difference a - b is 2, we can set up a system of equations and solve for the values of a and b.

To find two numbers a and b whose sum a + b is 0 and whose difference a - b is 2, we can set up a system of equations:

a + b = 0

a - b = 2

We can solve this system by adding the two equations:

(a + b) + (a - b) = 0 + 2

2a = 2

a = 1

Substituting the value of a back into one of the equations, we find that b = -1.

Therefore, the two numbers are 1 and -1.

The simplification form  of the expression 15x+14y+3x+7y is 18x + 21y option (D) 18x + 21y is correct.

It is defined as the combination of constants and variables with mathematical operators.

It is given that:

15x+14y+3x+7y

After simplification,

Adding like terms:

= 18x + 21y

Thus, the simplification form  of the expression 15x+14y+3x+7y is 18x + 21y option (D) 18x + 21y is correct.

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Final answer:

To confirm that a transformation is not a rigid motion, use a protractor to check for any changes in angles within a shape post-transformation. If the angles have changed, the transformation is not rigid. Corresponding side length changes further confirm this.

Explanation:

To confirm that a transformation is not a rigid motion using a protractor, you must look for changes in the shape's size or the angles between any two adjacent sides. A rigid motion, also known as an isometry, will preserve distances and angles between all points on a shape. Therefore, if after a transformation, using a protractor shows that the angles within the shape have changed, or that the corresponding sides are not congruent, then the transformation is not a rigid motion.

For example, if you have a triangle and apply a transformation, such as dilation or shearing, the new angles can be measured with a protractor. If they are different from the original triangle's angles, this confirms the transformation was not a rigid motion. Additionally, if the distances between corresponding points on the figure have changed, which you can measure with a ruler, this also confirms that the transformation is not rigid.

Answer:

between 67 and 103 beats per minute inclusive

The first factor has a degree of 7, the second has a degree of 6, and the third has a degree of 5. The product has a degree of 7, the highest among them.

To determine the degree of each polynomial in the expression[tex]2a^7 - 16a^6 + 18a^5[/tex], we need to understand that the degree of a polynomial is the highest exponent of the variable in that polynomial.

The first factor is[tex]2a^7[/tex]. Here, the highest exponent of the variable 'a' is 7. So, the degree of the first factor is 7.

The second factor is[tex]-16a^6[/tex]. In this case, the highest exponent of 'a' is 6. So, the degree of the second factor is 6.

The third factor is [tex]18a^5[/tex]. Here, the highest exponent of 'a' is 5. So, the degree of the third factor is 5.

Now, to find the degree of the product of these three factors when added together, we need to find the highest degree among them. In this case, the highest degree is 7 (from the first factor). Therefore, the product has a degree of 7.

In summary:

The first factor has a degree of 7.

The second factor has a degree of 6.

The third factor has a degree of 5.

The product has a degree of 7.

These degrees reflect the highest power of 'a' in each term of the polynomial expression.

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Answer:

17 cars

Step-by-step explanation:

Mike collects toy cars. He decides to put all of his toy cars in a line so that he can count them.

It is given that 9th car in the line ends up being exactly at the middle of the line.

This statement shows that before and after the middle car there were 8 cars.

So the cars in the line is 8 + 1(middle) + 8 = 17 cars

Mike have total 17 cars.

Answer:

[tex]3^{8}[/tex]

Step-by-step explanation:

[tex]3^{8}[/tex]x1 any expression multiplied by 1 remains the same

alternative form - 6561

Answer:

40 x 50 = 2,000

Step-by-step explanation:

When we round a number, first identify the digit to round. Then proceed with the following two rules:

(a) If the number to the right of the digit to round is 0, 1, 2, 3, or 4 (that is, less than 5), then keep the digit to round and change the rest of the digits to the right of the digit to round to zero.

(b) If the number to the right of the digit to be rounded is 5, 6, 7, 8, or 9 (that is, greater than or equal to 5), then add one to the digit to round and change the rest of the digits to the right of the digit to round to zero.

In our case, we apply the two rules, rounding to the nearest ten, as follows:

For 38 = 40

Apply rule (b) since 8 is greater than or equal to 5, then add 1 to 3 to get 4, then change 8 to zero. The result is 40.

For 47 = 50

Apply rule (b) since 7 is greater than or equal to 5, then add 1 to 4 to get 5, then change 7 to zero. The result is 50.

Now, multiply to estimate the amount of grapes that Jerry customers buy every day.

40 x 50 = 2,000

Hope this helps!