Solved on Feb 09, 2024

Find the value of $y$ given the equation $C = (y - 8)h$ .

STEP 1

Assumptions
1. The equation given is $C = (y - 8)h$ .
2. We need to solve for $y$ .
3. $C$ and $h$ are known constants.

STEP 2

To solve for $y$ , we first need to isolate $y$ on one side of the equation. We can start by dividing both sides of the equation by $h$ to get rid of the multiplication by $h$ .
$\frac{C}{h} = \frac{(y - 8)h}{h}$

STEP 3

Simplify the right side of the equation by canceling out $h$ .
$\frac{C}{h} = y - 8$

STEP 4

Now, we need to get $y$ by itself. To do this, we add 8 to both sides of the equation.
$\frac{C}{h} + 8 = y - 8 + 8$

STEP 5

Simplify the equation by combining like terms on the right side.
$\frac{C}{h} + 8 = y$

STEP 6

We have now isolated $y$ . The solution to the equation is:
$y = \frac{C}{h} + 8$

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Find the value of $y$ given the equation $C = (y - 8)h$ .

STEP 1

Assumptions
1. The equation given is $C = (y - 8)h$ .
2. We need to solve for $y$ .
3. $C$ and $h$ are known constants.

STEP 2

To solve for $y$ , we first need to isolate $y$ on one side of the equation. We can start by dividing both sides of the equation by $h$ to get rid of the multiplication by $h$ .
$\frac{C}{h} = \frac{(y - 8)h}{h}$

STEP 3

Simplify the right side of the equation by canceling out $h$ .
$\frac{C}{h} = y - 8$

STEP 4

Now, we need to get $y$ by itself. To do this, we add 8 to both sides of the equation.
$\frac{C}{h} + 8 = y - 8 + 8$

STEP 5

Simplify the equation by combining like terms on the right side.
$\frac{C}{h} + 8 = y$

STEP 6

We have now isolated $y$ . The solution to the equation is:
$y = \frac{C}{h} + 8$

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Find the value of yyy given the equation C=(y−8)hC = (y - 8)hC=(y−8)h.

STEP 1

Assumptions1. The equation given is C=(y−8)h C = (y - 8)h C=(y−8)h.2. We need to solve for y y y.3. C C C and h h h are known constants.

STEP 2

To solve for y y y, we first need to isolate y y y on one side of the equation. We can start by dividing both sides of the equation by h h h to get rid of the multiplication by h h h.Ch=(y−8)hh \frac{C}{h} = \frac{(y - 8)h}{h} hC​=h(y−8)h​

STEP 3

Simplify the right side of the equation by canceling out h h h.Ch=y−8 \frac{C}{h} = y - 8 hC​=y−8

STEP 4

Now, we need to get y y y by itself. To do this, we add 8 to both sides of the equation.Ch+8=y−8+8 \frac{C}{h} + 8 = y - 8 + 8 hC​+8=y−8+8

STEP 5

Simplify the equation by combining like terms on the right side.Ch+8=y \frac{C}{h} + 8 = y hC​+8=y

STEP 6

We have now isolated y y y. The solution to the equation is:y=Ch+8 y = \frac{C}{h} + 8 y=hC​+8

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Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

Find the value of $y$ given the equation $C = (y - 8)h$ .

Assumptions
1. The equation given is $C = (y - 8)h$ .
2. We need to solve for $y$ .
3. $C$ and $h$ are known constants.

To solve for $y$ , we first need to isolate $y$ on one side of the equation. We can start by dividing both sides of the equation by $h$ to get rid of the multiplication by $h$ .
$\frac{C}{h} = \frac{(y - 8)h}{h}$

Simplify the right side of the equation by canceling out $h$ .
$\frac{C}{h} = y - 8$

Now, we need to get $y$ by itself. To do this, we add 8 to both sides of the equation.
$\frac{C}{h} + 8 = y - 8 + 8$

Simplify the equation by combining like terms on the right side.
$\frac{C}{h} + 8 = y$

We have now isolated $y$ . The solution to the equation is:
$y = \frac{C}{h} + 8$