Question

The real numbers `a, b` and `c` satisfy the equation: `3a^2 + 4b^2 + 18c^2 - 4ab - 12ac = 0`. By forming perfect squares, how do you prove that `a=2b=c`?

Answer 1

`a=2b=3c` , See the explanation and the proof below.

Explanation:

`3a^2+4b^2+18c^2-4ab-12ac=0`
Notice that the coefficients are all even except for a^2 i.e: 3, rewrite as follow to group for factoring:
`a^2-4ab+4b^2+2a^2-12ac+18c^2=0`
`(a^2-4ab+4b^2)+2(a^2-6ac+9c^2)=0`
`(a - 2b)^2+2(a-3c)^2=0`
We have a perfect square term plus twice perfect square of another term equal to zero, for this to be true each term of the sum must be equal to zero, then:
`(a - 2b)^2=0` and `2(a-3c)^2=0`
`a-2b=0` and `a-3c=0`
`a=2b` and `a=3c`
thus:
`a=2b=3c`
Hence proved.