Math, asked by hoberoi010, 8 months ago

find the coefficient of x-¹ in 1+2x²+x⁴)(1+1/x)⁸​

Answers

Answered by tapanpai2505
1

Step-by-step explanation:

The coefficient of x¹⁰ in the expansion of (1+x)²(1+x²)³(1+x³)⁴ is equal to

the coefficient of x¹⁰ in the expansion of (1+x)²(1+x²)³(1+4x³+6x⁶+4x⁹)

We can ignore the last term in the expansion (1+x³)⁴, since its exponent is

greater than 10.

= Coefficient of x¹⁰ in the expansion of (1+x)²(1+x²)³

+4∗Coefficient of x⁷ in the expansion of (1+x)²(1+x²)³

+6∗Coefficient of x⁴ in the expansion of (1+x)²(1+x²)³

+4∗Coefficient of x in the expansion of (1+x)²(1+x²)³,

Coefficient of x¹⁰ in the expansion of (1+x)²(1+x²)³=0, since the highest degree term in the expansion is 8.

Coefficient of x⁷ in the expansion of (1+x)²(1+x²)³=

Coefficient of x⁷ in the expansion of (1+2∗x+x²)(1+x²)³

=2∗Coefficient of x⁶ in the expansion of (1+x²)³

=2∗1=2,

Coefficient of x⁴ in the expansion of (1+x)²(1+x²)³=

Coefficient of x⁴ in the expansion of (1+2∗x+x²)(1+x²)³

=1*Coefficient of x⁴ in the expansion of $$(1+x²)³ +

1*Coefficient of x in the expansion of (1+x²)³

=3+3=6

Coefficient of x in the expansion of (1+2∗x+x²)(1+x²)³

=2∗ constant in the expansion of (1+x²)³

=2,

Thus ,the coefficient of x¹⁰ in the expansion of (1+x)²(1+x²)³(1+x³)⁴

=0+4∗2+6∗6+4∗2

=52.

Answered by Nikita2481
0

Answer might the answer is 1/2

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