M L Aggarwal Solutions for Chapter: Sequences and Series, Exercise 10: EXERCISE 10.10

The number of terms in an $\mathrm{A}.\mathrm{P}$ is even, the sum of odd terms is $24$ and the sum of even terms is $30$. If the last term exceeds the first term by $\frac{21}{2}$,find the number of terms in the $\mathrm{A}.\mathrm{P}$.

If $a, b, c$ are in $\mathrm{G}.\mathrm{P}$, then prove that $\frac{a^2+ab+b^2}{bc+ca+ab}=\frac{b+a}{c+b}$

If $a, b, c$ are in $\mathrm{G}.\mathrm{P}$, then prove that $a^2{b}^2{c}^2\left[\frac{1}{a^3}+\frac{1}{b^3}+\frac{1}{c^3}\right]=a^3+b^3+c^3$

Does the exist a geometric progression containing $8,12\text{ and }27$ as three of its terms? If it exists, how many such progressions are possible ?

Show that the number $1111...11$ having $65$ digits is not a prime.

Prove that sum of cubes of any number of consecutive natural numbers is always divisible by the sum of these numbers.

Sum to infinity the following series $1^2+3^{2}x+5^2{x}^2+7^2{x}^3+\dots ,\left|x\right|<1$.

Sum to infinity the following series $1^2+5^{2}x+9^2{x}^2+{13}^2{x}^3+\dots ,\left|x\right|<1$