It is a common to ask to have to convert equation of line from slope intercept to standard form, as demonstrated by the pictures below.
Convert $$ y = \frac 5 4 x + 5 $$, graphed on the right, to standard form.
Show AnswerMultiply by the least common denominator of the fractions (if any)
step 1 answerThe only fraction is $$ \frac < 5> < \red 4>$$ so you can multiply everything by 4.
$ \red 4 \cdot y = \red 4 \cdot \big( \frac < 5>< \red 4>x +5 \big) \\ 4y = 5x + 20 $
Move" y1 to the other side by adding its opposite to both sides of the equation and simplify
step 2 answerSolve for the y-intercept (or "b" in the slope intercept equation) which is 20 in this example.
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Toggle Points Share this exact problem! (This link will show the same work that you can see on this page)Convert the the equation below from slope intercept form to standard form $$ y = \frac 2 3 x -4 $$
Show AnswerMultiply by the least common denominator of the fractions
step 1 answerThe only fraction is $$ \frac $$ so you can multiply everything by 3.
$$ \red 3 \cdot y = \red 3 \big( \frac -4 \big) \\ 3y = 2x-12 $$
Solve for the y-intercept (or "b" in the slope intercept equation) which is 12 in this problem.
step 2 answerChange the the equation below from slope intercept to standard from $$ y = \frac 1 2 x + 5 $$
Multiply by the least common denominator of the fractions (if any)
step 1 answerThe only fraction is $$ \frac$$ so you can multiply everything by 2.
$$ \red 2 \cdot y =\red 2 \cdot \big( \frac x + 5 \big) \\2y = x + 10 $$
Solve for the y-intercept (or "b" in the slope intercept equation) which is 10 in this problem.
step 2 answer AdvertisementConvert the the equation below from slope intercept to standard from $$ y = \frac 2 3 x + \frac 5 9 $$
Multiply all terms by the least common denominator of the fractions
step 1 answerUnlike the prior examples, this problem has two fractions $$ \big( \frac 2 3 \text < and >\frac 5 9 \big) $$ so you can multiply everything by their common denominator of $$ \red 9$$ .
$$ \red 9 \cdot y = \red 9 \big( \frac 2 3 x + \frac 5 9 \big) \\ 9y = 6x + 5 $$
Solve for the y-intercept (or "b" in the slope intercept equation) which, in this example, is 5.
