Rewrite the equation in Ax+By=C form. Use integers for A, B, and C.
Y=(1/5)x-1
To rewrite the equation in the form Ax + By = C, we need to eliminate fractions.
Given equation: Y = (1/5)x - 1
To remove the fraction, we can multiply every term by 5:
5Y = 5 * (1/5)x - 5 * 1
Simplifying, we get:
5Y = x - 5
Now, let's rearrange the equation to match the required form:
x - 5 = 5Y
Rearranging further:
x - 5Y = 0
Thus, the equation in Ax + By = C form is:
x - 5Y = 0, where A = 1, B = -5, and C = 0.
To rewrite the equation in the form Ax + By = C, we need to eliminate any fractions from the equation and convert the equation to standard form.
The given equation is:
Y = (1/5)x - 1
First, let's get rid of the fraction (1/5) by multiplying both sides of the equation by 5:
5Y = (1/5)x * 5 - 1 * 5
5Y = x - 5
Next, we want the equation in the form Ax + By = C, so we need to rearrange it:
x - 5 = 5Y
To proceed, let's rewrite this equation as:
x - 5 - 5Y = 0
Now, we rearrange it to have the x and y terms on the left side and a constant on the right side:
x - 5Y = 5
Therefore, the equation Y = (1/5)x - 1 can be rewritten in the form Ax + By = C as x - 5Y = 5. In this form, A = 1, B = -5, and C = 5.
first, multiply by 5 to get rid of the fraction.
5y = x - 5
now just finish it off