Rewrite the equation in Ax+By=C form.
Use integers for A,B,and C.
y=1/6x+3
To rewrite the equation in Ax+By=C form, we need to get rid of the fraction in front of the x term. We can do this by multiplying every term in the equation by the common denominator of 6 to eliminate the fraction.
Multiply each term by 6:
6y = 6(1/6x) + 6(3)
6y = x + 18
Now, rewrite in Ax+By=C form by rearranging the equation:
x + (-6y) = -18
So, the equation in Ax+By=C form is x - 6y = -18
you sure
My apologies for the mistake in my previous response. Let's correct the equation.
The original equation is y = (1/6)x + 3.
To rewrite it in Ax + By = C form, we need to eliminate the fraction. We can do this by multiplying every term by 6 to clear the denominator:
6y = 6(1/6)x + 6(3)
6y = x + 18
Now, rearrange the equation to Ax + By = C form:
x - 6y = -18
Hence, the correct equation in Ax + By = C form is x - 6y = -18.
To rewrite the equation y = (1/6)x + 3 in Ax + By = C form, we need to eliminate the fraction and rearrange the equation.
First, let's clear the fraction by multiplying every term in the equation by 6 to get rid of the denominator:
6 * y = 6 * (1/6)x + 6 * 3
6y = x + 18
Next, we want to rearrange the equation in the form Ax + By = C, so we move the terms around:
x - 6y = -18
Now, the equation is in the desired form: Ax + By = C.
In this case, we have A = 1, B = -6, and C = -18.