2 Answers

Lucas Alanis · Answer 1 · 2019-10-05T15:12:29+0000

Answer:

-10a^(2) b^(6)

Explanation:

For
(a - b^(2) )^(5) , use the 5th row of the Pascal Triangle to expand the binomial.

Apply the Binomial Theorem and simplify.

Count the number of terms and find the 4th term.

Furquan Khan · Answer 2 · 2019-10-06T23:39:06+0000

Answer:

Final answer is
-10a^2 b^6 .

Explanation:

Given expression is
(a-b^2)^5 .

Now we need to find the fourth term of the given expression
(a-b^2)^5 . So apply the nth term formula using binomial expansion.

exponent n=5

4th term means we use r=4-1=3

x=a,
y=-b^2

rth term in expansion of
(x+y)^n is given by formula:

$(n!)/(\left(n-r\right)!\cdot r!)x^(\left(n-r\right))\cdot y^r$

$=(5!)/(\left(5-3\right)!\cdot 3!)a^(\left(5-3\right))\cdot (-b^2)^3$

$=(5!)/(\left(2\right)!\cdot 3!)a^(\left(2\right))\cdot (-b^2)^3$

$=(5!)/(\left(2\right)!\cdot3!)a^2\cdot-b^6$

$=-(120)/(2\cdot6)a^2\cdot b^6$

$=-10a^2\cdot b^6$

Hence final answer is
-10a^2 b^6 .

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