Mathematics · JEE

Online Practice: Binomial theorem for a positive integral index for JEE

9+ syllabus-aligned questions available

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Sharpen your mathematics preparation with interactive online practice for Binomial theorem for a positive integral index. Goodmarks offers 9+ JEE-style MCQs mapped to the official syllabus, each with detailed explanations so you learn from every attempt.

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Q1MathsUnit 5: Binomial Theorem and Its Simple Applications

Sum of coefficients in the expeansion of

(a+b+c)^{8}

Q2MathsUnit 5: Binomial Theorem and Its Simple Applications

Evaluate the following

(0.98)^{2}

Q3MathsUnit 5: Binomial Theorem and Its Simple Applications

Using identities, evaluate

998^{2}

Q4MathsUnit 5: Binomial Theorem and Its Simple Applications

The number of dissimilar terms in the expansion of

\left(1-3 x+3 x^{2}-x^{3}\right)^{20}

Q5MathsUnit 5: Binomial Theorem and Its Simple Applications

Using the formula for squaring a binomial the value of

(999)^{2}

is:

Q6MathsUnit 5: Binomial Theorem and Its Simple Applications

Evaluate using expansion of

(a+b)^{2}

(a-b)^{2}:

(9.4)^{2}

Q7MathsUnit 5: Binomial Theorem and Its Simple Applications

Assertion

(\sqrt{2}-1)^{n}

can be expressed as

\sqrt{N}

\sqrt{N-1}

for

\forall N>1

and

n \in N

Reason

(\sqrt{2}-1)^{n}

can be written in the form

\boldsymbol{\alpha}+\boldsymbol{\beta} \sqrt{\boldsymbol{2}} \forall, \boldsymbol{\alpha}, \boldsymbol{\beta}

are integers \& n is a positive integer.

Q8MathsUnit 5: Binomial Theorem and Its Simple Applications

a \neq 0

and

a-\frac{1}{a}=4,

find:

a^{3}-\frac{1}{a^{3}}

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How do I practice Binomial theorem for a positive integral index online for JEE?

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How many Binomial theorem for a positive integral index questions are available?

Goodmarks currently has 9+ JEE-aligned MCQs for Binomial theorem for a positive integral index, with more added regularly.

Is this aligned with the JEE Main syllabus?

Yes. All Mathematics questions on Goodmarks are organised by official JEE Main units and subtopics, including Binomial theorem for a positive integral index.

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Every question includes the correct answer and a step-by-step explanation. Free users can practise a random mix; Pro unlocks full subject and topic filters.