Yeah. That's OK.
You can test the divisors of 140. Eventually you will discover that 5 works. And that's as much as you need for this question.
So what are the divisors of 140?
±1, ±2, ±4, ±5, ±7, ±10, ±14, ±20 ±28, ±35, ±70, ±140
but there's no need to test the negative ones, so try only 1,2,4,5,7,10,14,20,28,35,70,140 - but once you find one you can factorise, so starting from the smallest ones,
1<sup>3</sup>+3(1)-140=-136
2<sup>3</sup>+3(2)-140=-126
4<sup>3</sup>+3(4)-140=-64
5<sup>3</sup>+3(5)-140=0 STOP and factorise:
a<sup>3</sup>+3a-140=(a-5)(a<sup>2</sup>+5a+28)=0, as affinity said and for the quadratic factor, Δ=-87 < 0 so there is only 1 real root and it's a=5.
However this method doesn't always work and there is a more general formula for cubics:
and using this formula we see that for your question,
I made a thread on cubics and quartics at
http://community.boredofstudies.org...acurricular-topics/99063/cubics-quartics.html
Here is an attachment of a more complete version of affinity's method:
