Mathematics · JEE

Binomial Theorem and Its Simple Applications Revision for JEE

19+ syllabus-aligned questions available

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Revise Binomial Theorem and Its Simple Applications by covering every subtopic once, drilling formulas, then solving 19+ timed MCQs with full solutions.

Use this Binomial Theorem and Its Simple Applications revision checklist before mocks and the final exam. Reinforce concepts with 19+ syllabus-aligned MCQs on Goodmarks.

Revision checklist

1.Binomial theorem for positive integer n
2.General term and middle term
3.Coefficient problems
4.Revise Binomial theorem for a positive integral index with 10 MCQs
5.Revise General term and middle term and simple applications with 10 MCQs

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Subtopics in Binomial Theorem and Its Simple Applications

View Binomial Theorem and Its Simple Applications formula sheet — 33+ JEE formulas

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Q1MathsUnit 5: Binomial Theorem and Its Simple Applications

The coefficient of

x^{9}

in the expansion of

\left(x^{3}+\frac{1}{2^{t}}\right)^{11},

where

t=\log _{\sqrt{2}}\left(x^{\frac{3}{2}}\right)

Q2MathsUnit 5: Binomial Theorem and Its Simple Applications

Sum of coefficients in the expeansion of

(a+b+c)^{8}

Q3MathsUnit 5: Binomial Theorem and Its Simple Applications

If it is known that the third term of the binomial expansion

\left(x+x^{\log _{10} x}\right)^{3}

10^{6}

then

x

is equal to

Q4MathsUnit 5: Binomial Theorem and Its Simple Applications

If the middle term in the expansion of

\left(x^{2}+\frac{1}{x}\right)^{n}

924 x^{6},

then

n=

Q5MathsUnit 5: Binomial Theorem and Its Simple Applications

Evaluate the following

(0.98)^{2}

Q6MathsUnit 5: Binomial Theorem and Its Simple Applications

The coeffcient of

x^{10}

in the expansion of

(1+x)^{2}\left(1+x^{2}\right)^{3}\left(1+x^{3}\right)^{4}

is equal to

Q7MathsUnit 5: Binomial Theorem and Its Simple Applications

The number of terms with integral coefficients in the expansion of

\left(7^{1 / 3}+5^{1 / 2} \cdot x\right)^{600}

Q8MathsUnit 5: Binomial Theorem and Its Simple Applications

\forall n \in N, 3^{3 n}-26^{n}

is divisible by

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Frequently asked questions

How should I revise Binomial Theorem and Its Simple Applications before JEE?

Follow the checklist on this page, revise formulas daily, and attempt mixed MCQs every 2–3 days.