How do you write $0.25y=10$ in standard form and what is A, B, C?

Question

3783 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-01-15T07:01:32

Standard form: $0x + 0.25y - 10 = 0$

$a = 0$ , $b = 0.25$ , and $c = -10$

$0.25y = 10$

$=> 0.25y - 10 = 0$

$=> 0x + 0.25y - 10 = 0$

This is the standard form of the given equation. After comparing this equation with the standard form of any linear equation

$ax + by + c = 0$

We get

${(a = 0), (b = 0.25), (c = -10) :}$
I have used a, b and c instead of A, B and C respectively.

How do you write 0.25y=100.25y=10 in standard form and what is A, B, C?