( 1)x^4-7x^2+6

=(x^2- 1)(x^2-6)

= (x+1) (x-1) (x+√ 6) (x-√ 6) (cross multiplication)

(2)x^4-5x？ -36

=(x^2-9)(x^2+4)

= (x-3) (x+3) (x 2+4) (cross multiplication)

(3)4x^4-65x？ y？ + 16y^4

=(4x^2-y^2)(x^2- 16y^2)

=(2x-y)(2x+y)(x-4y)(x+4y) (cross multiplication)

(4)4a？ -B? +6a-3b

=(2a+b)(2a-b)+3(2a-b)

=(2a-b)(2a+b+3) (group decomposition method)

(5)(x？ -3)? -4x？

=x^4-6x^2+9-4x^2

=x^4- 10x^2+9

=(x^2- 1)(x^2-9)

= (x+1) (x-1) (x+3) (x-3) (cross multiplication)

(6)x？ (x-2)？ -9

=[x(x-2)-3][x(x-2)+3]

=(x^2-2x-3)(x^2-2x+3)

= (x-3) (x+ 1) (x 2-2x+3) (inverse application of square difference formula)

(7)(3x？ +2x+ 1)？ -(2x？ +3x+3)？ Did you miss a "-"in this question? If so, please refer to the following solution.

=(3x？ +2x+ 1+2x？ +3x+3)(3x？ +2x+ 1-2x？ -3x-3)

=(5x？ +5x+4)(x？ -x-2)

=(5x？ +5x+4)(x+ 1)(x-2) (inverse application of square difference formula)

(8)(x？ +x)？ - 17(x？ +x)+60

=(x^2+x- 12)(x^2+x-5)

= (x-3) (x+4) (x 2+x-5) (cross multiplication as a whole)

(9)(x？ +2 times)? -7(x？ +2x)-8

=(x^2+2x-8)(x^2+2x+ 1)

= (x+4) (x-2) (x+ 1) 2 (cross multiplication as a whole)

( 10)-7x？ y- 14xy？ +49x？ y？

=-7xy(x+2y+7xy) (common factor extraction method)

(Simplify before evaluating)

1/(a？ +3a) (a？ +3a+2) divided by (a+3) (a+ 1)-(2) (a+2), where a=√3.

Solution: The original formula = [(a+1) (a+2)] [a (a+3)] * [(a+3)/(a+1)] = (a+2)/2.

When a=√3, the original formula ①=√3/6.

The value is √3/6.

2/? Given |a-4|+(√b-9)=0, calculate (a? +ab) (b？ )*(a？ -ab) (a？ -B? The value of).

Solution: So a-4=0 and √b-9=0,

∴? A=4，b=8 1。

∴? The original formula = B2/A2 = 656116 = 410.0625.

That is, the value is 4 10.0625 (or 656116).

3/? If 4x-3 is a polynomial 4x? A factor of +5x+a, and find the value of a.

Solution: Let 4x-3 = 0,

X=3/4，

Substitute 4x 2+5x+a = 0,

9/4+ 15/4+a=0。

Solution: a=-6.

That is, a=-6.

4/? It is known that x-x is 1=? -? 3? , find the value of the fourth power of x+65438+0 of the fourth power of x.

Solution: ∵? x- 1/x=-3，

∴? x^2-2+ 1/x^2=9，

∴? x^2+ 1/x^2= 1 1，

∴? x^4+2+ 1/x^4= 12 1，

∴? x^4+ 1/x^4= 1 19.

The value is 1 19.

Just use your hands! ! ! ! ! ? Hope to adopt! ! ! ! ! ! ? TAT is very tired.