Answer:
[tex](6x^2-5)(x^2+2)[/tex]
Step-by-step explanation:
In [tex]6x^4-5x^2+12x^2-10[/tex] we can rewrite the expression as:
[tex](6x^4-5x^2)+(12x^2-10)[/tex] to factor each part individually:
First in [tex]6x^4-5x^2[/tex] we can factor out the GCF (x²) to find:
⇒ x²(6x²-5)
And in 12x²-10 we can factor out the GCF (2) to find:
⇒ 2(6x²-5)
And we can use substitution to rewrite the orignal expression as:
⇒ x²(6x²-5)+2(6x²-5)
And in this expression the GCF is 6x²-5 and so after factoring this out we find that:
[tex]6x^4-5x^2+12x^2-10[/tex] = (x²+2)(6x²-5)
