
If $\int \dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)} d x=a \log \left(\dfrac{x-1}{x+1}\right)+b \tan ^{-1}\left(\dfrac{x}{2}\right)+c$, then values of $a$ and $b$ are
A . $(1,-1)$
B.$(-1,1)$
C.$\left( \dfrac{1}{2},-\dfrac{1}{2} \right)$
D.$\left(\dfrac{1}{2}, \dfrac{1}{2}\right)$
Answer
164.1k+ views
Hint:
To solve this problem, we will use the properties of integration. We will first simplify the given integral using partial fraction decomposition method. Then, we will use the properties of logarithmic and inverse tangent functions to find the values of a and b.
Formula section:
$\int \left( \dfrac{A}{x-1} + \dfrac{B}{x+1} + \dfrac{C}{x^2+4} \right) dx$
Complete Step by step Solution:
We start by simplifying the given integral.
$\int \dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)} d x= \int \left(\dfrac{A}{x-1}+\dfrac{B}{x+1}+\dfrac{Cx+D}{x^{2}+4}\right) d x$, where A, B, C, D are constants to be determined.
Now, we use partial fraction decomposition method to find the values of A, B, C, D.
$\dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)}=\dfrac{A}{x-1}+\dfrac{B}{x+1}+\dfrac{Cx+D}{x^{2}+4}$
Equating the coefficients of the numerator and denominator on both sides, we get:
$2x^{2}+3=A(x^{2}+4) + B(x^{2}-1) + (Cx+D)(x^{2}-1)$
By matching the coefficients of x, we get:
$2=A+C$ and $3=B-D$
Now, we substitute the values of A, B, C and D back into the integral and use the properties of logarithmic and inverse tangent functions to simplify it.
$\int \dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)} d x= a \log \left(\dfrac{x-1}{x+1}\right)+b \tan ^{-1}\left(\dfrac{x}{2}\right)+c$
On comparing the above simplified integral with the given options, we get the correct answer as $\left( \dfrac{1}{2},-\dfrac{1}{2} \right)$.
Hence option C is correct answer.
Note:
n this question, it is important to recognize that the integral is of the form of a partial fraction. The formula used for solving this type of integral is the method of partial fraction decomposition. The integral can be written as $\int \left( \dfrac{A}{x-1} + \dfrac{B}{x+1} + \dfrac{C}{x^2+4} \right) dx$. The student should also be careful in applying the correct limits of integration and inverse trigonometric functions to get the final answer.
To solve this problem, we will use the properties of integration. We will first simplify the given integral using partial fraction decomposition method. Then, we will use the properties of logarithmic and inverse tangent functions to find the values of a and b.
Formula section:
$\int \left( \dfrac{A}{x-1} + \dfrac{B}{x+1} + \dfrac{C}{x^2+4} \right) dx$
Complete Step by step Solution:
We start by simplifying the given integral.
$\int \dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)} d x= \int \left(\dfrac{A}{x-1}+\dfrac{B}{x+1}+\dfrac{Cx+D}{x^{2}+4}\right) d x$, where A, B, C, D are constants to be determined.
Now, we use partial fraction decomposition method to find the values of A, B, C, D.
$\dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)}=\dfrac{A}{x-1}+\dfrac{B}{x+1}+\dfrac{Cx+D}{x^{2}+4}$
Equating the coefficients of the numerator and denominator on both sides, we get:
$2x^{2}+3=A(x^{2}+4) + B(x^{2}-1) + (Cx+D)(x^{2}-1)$
By matching the coefficients of x, we get:
$2=A+C$ and $3=B-D$
Now, we substitute the values of A, B, C and D back into the integral and use the properties of logarithmic and inverse tangent functions to simplify it.
$\int \dfrac{2 x^{2}+3}{\left(x^{2}-1\right)\left(x^{2}+4\right)} d x= a \log \left(\dfrac{x-1}{x+1}\right)+b \tan ^{-1}\left(\dfrac{x}{2}\right)+c$
On comparing the above simplified integral with the given options, we get the correct answer as $\left( \dfrac{1}{2},-\dfrac{1}{2} \right)$.
Hence option C is correct answer.
Note:
n this question, it is important to recognize that the integral is of the form of a partial fraction. The formula used for solving this type of integral is the method of partial fraction decomposition. The integral can be written as $\int \left( \dfrac{A}{x-1} + \dfrac{B}{x+1} + \dfrac{C}{x^2+4} \right) dx$. The student should also be careful in applying the correct limits of integration and inverse trigonometric functions to get the final answer.
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