Skip to main content

What is the integration of log (1+x^2)?

Use integration by part to solve this question.

\[% \color{red}{\boxed{\color{blue}{\boxed{\color{black}{\text{ Using integration by parts, we have}\\\displaystyle \quad \int \ln \left(1+x^{2}\right) d x\\\displaystyle =x \ln \left(1+x^{2}\right)-\int x \frac{2 x}{1+x^{2}} d x \\\displaystyle =x \ln \left(1+x^{2}\right)-2 \int\left(1-\frac{1}{1+x^{2}}\right) d x \\\displaystyle =x \ln \left(1+x^{2}\right)-2 x+2 \tan ^{-1} x+C}}}}} \]

Comments

Popular posts from this blog

Straight Line - Notes, Concept and All Important Formula

STRAIGHT LINE Table Of Contents 1. RELATION BETWEEN CARTESIAN CO-ORDINATE & POLAR CO-ORDINATE SYSTEM If \((x, y)\) are Cartesian co-ordinates of a point \(P\) , then : \(x=r \cos \theta\) , \(y=r \sin \theta\) and \(r=\sqrt{x^{2}+y^{2}}, \quad \theta=\tan ^{-1}\left(\dfrac{y}{x}\right)\) All Chapter Notes, Concept and Important Formula 2. DISTANCE FORMULA AND ITS APPLICATIONS : If \(\mathrm{A}\left(\mathrm{x}_{1}, \mathrm{y}_{1}\right)\) and \(\mathrm{B}\left(\mathrm{x}_{2}, \mathrm{y}_{2}\right)\) are two points, then \(\mathbf{A B=\sqrt{\left(x_{2}-x_{1}\right)^{2}+\left(y_{2}-y_{1}\right)^{2}}}\) Note : (i) Three given points \(A, B\) and \(C\) are collinear, when sum of any two distances out of \(\mathrm{AB}, \mathrm{BC}, \mathrm{CA}\) is equal to the remaining third otherwise the points will be the vertices of triangle. (ii) Let \(A, B, C \& D\) be the four given points in a plane. Then the quadrilateral will be: (a) Square if \(A B=B C=C D=D...

Binomial Theorem - Notes, Concept and All Important Formula

BINOMIAL THEOREM \((x+y)^{n}={ }^{n} C_{0} x^{n}+{ }^{n} C_{1} x^{n-1} y+{ }^{n} C_{2} x^{n-2} y^{2}+\ldots\) \( . .+{ }^{n} C_{r} x^{n-r} y^{r}+\ldots\) \( . .+{ }^{n} C_{n} y^{n}\) \(=\displaystyle \sum_{ r =0}^{ n }{ }^{ n } C _{ r } x ^{ n - r } y ^{ r }\) , where \(n \in N\) . 1. IMPORTANT TERMS IN THE BINOMIAL EXPANSION ARE : (a) General term: The general term or the \((r+1)^{\text {th }}\) term in the expansion of \((x+y)^{n}\) is given by \(T _{ r +1}={ }^{ n } C _{ r } x ^{ n \cdot r } \cdot y ^{r}\) (b) Middle term : The middle term (s) is the expansion of \((x+y)^{n}\) is (are) : (i) If \(n\) is even, there is only one middle term which is given by \(T _{( n +2) / 2}={ }^{ n } C _{ n / 2} \cdot x ^{ n / 2} \cdot y ^{ n / 2}\) (ii) If \(n\) is odd, there are two middle terms which are \(T _{( n +1) / 2}\) & \(T _{[( n +1) / 2]+1}\) (c) Term independent of x : Term independent of \(x\) contains no \(x\) ; Hence find the value of r for which the exponent of \(x\)...

Trigonometry Equation - Notes, Concept and All Important Formula

TRIGONOMETRIC EQUATION 1. TRIGONOMETRIC EQUATION : An equation involving one or more trigonometrical ratios of unknown angles is called a trigonometric equation. All Chapter Notes, Concept and Important Formula 2. SOLUTION OF TRIGONOMETRIC EQUATION : A value of the unknown angle which satisfies the given equations is called a solution of the trigonometric equation. (a) Principal solution :- The solution of the trigonometric equation lying in the interval \([0,2 \pi]\) . (b) General solution :- Since all the trigonometric functions are many one & periodic, hence there are infinite values of \(\theta\) for which trigonometric functions have the same value. All such possible values of \(\theta\) for which the given trigonometric function is satisfied is given by a general formula. Such a general formula is called general solutions of trigonometric equation. 3. GENERAL SOLUTIONS OF SOME TRIGONOMETRICE EQUATIONS (TO BE REMEMBERED) :   (a) If \(\sin \theta=0\) , then \(\theta=...