For this case we must factor the following polynomial:
[tex]5y ^ 4 + 11y ^ 2 + 2[/tex]
We rewrite [tex]y ^ 4[/tex]as [tex](y^ 2) ^ 2[/tex]:
[tex]5 (y ^ 2) ^ 2 + 11y ^ 2 + 2[/tex]
We make a change of variable:
[tex]u = y ^ 2[/tex]
We replace:
[tex]5u ^ + 11u + 2[/tex]
we rewrite the middle term as a sum of two terms whose product of 5 * 2 = 10 and the sum of 11.
So:
[tex]5u ^ 2 + (1 + 10) u + 2[/tex]
We apply distributive property:
[tex]5u ^ 2 + u + 10u + 2[/tex]
We factor the highest common denominator of each group.
[tex](5u ^ 2 + u) + (10u + 2)\\u (5u + 1) +2 (5u + 1)[/tex]
We factor again:
[tex](u + 2) (5u + 1)[/tex]
Returning the change:
[tex](y ^ 2 + 2) (5y ^ 2 + 1)[/tex]
ANswer:
[tex](y ^ 2 + 2) (5y ^ 2 + 1)[/tex]
