Answer to Question #346431 in Algebra for bookaddict

Question #346431

a. Expand (𝑎+𝑏)⁵. Hence find the coefficient of 𝑥 in the expansion of (4𝑥+2/9𝑥)⁵

b. The coefficient of 𝑥² in the expansion of (1+𝑥)ⁿ is 45. Given that 𝑛 is a positive integer, find the value of 𝑛.

Expert's answer

"(a+b)^5=\\dbinom{5}{0}a^5+\\dbinom{5}{1}a^4b+\\dbinom{5}{2}a^3b^2"

"+\\dbinom{5}{3}a^2b^3+\\dbinom{5}{4}ab^4++\\dbinom{5}{5}b^5"

"=a^5+5a^4b+10a^3b^2+10a^2b^3+5ab^4+b^5"

"(4x+\\dfrac{2}{9x})^5=1024x^5+\\dfrac{5(256)(2)x^4}{9x}"

"+\\dfrac{10(64)(4)x^3}{81x^2}+\\dfrac{10(16)(8)x^2}{729x^3}+\\dfrac{5(4)(16)x}{6561x^4}"

"+\\dfrac{32x^4}{59049x^5}=1024x^5+\\dfrac{2560x^3}{9}+\\dfrac{2560x}{81}"

"+\\dfrac{1280}{729x}+\\dfrac{320}{6561x^3}+\\dfrac{32}{59049x^5}"

"(1+x)^n=\\dbinom{n}{0}+\\dbinom{n}{1}x+\\dbinom{n}{2}x^2+..."

"\\dbinom{n}{2}=45"

"\\dfrac{n(n-1)}{2}=45"

"n(n-1)=90, n>0"

Then "n=10"

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