IIT JEE HELP: 2012

Thursday, June 14, 2012

Application of the Cayley-Hamilton Theorem

Cayley-Hamilton Theorem, a basic theorem from Linear Algebra, is not a part of JEE syllabus. But this simple result comes in handy in JEE often.

According to the Cayley-Hamilton Theorem, every square matrix A satisfies its own Characteristic Equation.

For a matrix A of size n X n, the Characteristic Equation in variable $\bf{\lambda}$ is defined as,
$\bf{f(\lambda)=det|A-\lambda I|=0}$ ,
where I is the identity matrix of size n X n.
So according to the Cayley-Hamilton Theorem, we have,

$\bf{f(A)=0}$

This can be illustrated with an example.

Consider,
$\bf{A=\begin{bmatrix} 1 & 2 &3 \\ 5& 7 &11 \\ 13& 17 &19 \end{bmatrix}}$

Then,
$\bf{A-\lambda I=\begin{bmatrix} 1-\lambda & 2 &3 \\ 5& 7-\lambda &11 \\ 13& 17 &19-\lambda \end{bmatrix}}$

$\bf{f(\lambda)=det|A-\lambda I|=24 + 77\lambda + 27\lambda^2-\lambda^3}$

From the Cayley-Hamilton Theorem,

$\bf{f(A)=24 + 77A + 27A^2-A^3=0}$

And it can be verified that the above result is indeed correct.

Problem 1
Let
$\bf{A=\begin{bmatrix} 1 & 0 &0 \\ 0& 1 &1 \\ 0& -2 & 4 \end{bmatrix}}$
Suppose
$A^{-1}=\frac{1}{6}(A^2+cA+dI)$

Then determine c and d.
(IIT-JEE 2005)
Solution 1
The given equation gives,

By applying the Cayley-Hamilton Theorem on A, we have,

Direct comparison of (1) and (2) gives c=-6 and d=11

Thursday, June 7, 2012

Differentiation Under The Integral Sign

Problems related to differentiation under the integral sign are very common in IIT-JEE. We will see how to solve such problems using Leibniz's Rule given below.

$\bf{\frac{\mathrm{d} }{\mathrm{d} x}\int_{f_1(x)}^{f_2(x)}{g(x)}dx =g(f_2(x))f_2'(x)-g(f_1(x))f_1'(x)}$

Problem 1
If f(x) is differentiable and ,

$\bf{\int_{0}^{t^2}xf(x)dx}=\frac{2}{5}t^5$

find f(4/25)
(IIT-JEE 2004)
Solution
Differentiating both sides,

$\bf{t^2.f(t^2).2t}=\frac{2}{5}.5t^4$

Hence, f(4/25)=2/5 for t=2/5
PS: Note that -2/5 is also a valid answer. It was not among the options for the MCQ.

Problem 2
Solve
$\bf{\lim_{x \to \pi/4}\frac{\int_{2}^{sec^2x}f(t)dt}{x^2-\pi^2/16}}$

(IIT-JEE 2007)

Solution
This is in 0/0 form. So we can apply L'Hospital's Rule directly. Differentiating the numerator and the denominator separately, we have,

$\bf{=\lim_{x \to \pi/4}\frac{f(sec^2x).(2secx).(secx.tanx)}{2x}=\frac{8f(2)}{\pi}}$

Wednesday, June 6, 2012

Hello World :D

Hello !!!
I completed my Dual Degree (B Tech & M Tech) in Electrical Engineering from Indian Institute of Technology Madras aka IIT Madras in 2012.
I will be using this blog to help IIT-JEE aspirants with some tips.
You can contact me at : iqbal1729(at)gmail(dot)com.

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