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-
How to use it?
- Integral of d{x}:
-
Integral of (4x)/(1+x^2)
- Integral of 2x-1/(x-1)(x-2)
-
Integral of 2*exp(x)
-
Integral of 2/sinx
- Graphing y =:
-
(-x)/(x^2+1)
- Derivative of:
-
(-x)/(x^2+1)
-
Identical expressions
- (-x)/(x^ two + one)
- ( minus x) divide by (x squared plus 1)
- ( minus x) divide by (x to the power of two plus one)
- (-x)/(x2+1)
- -x/x2+1
- (-x)/(x²+1)
- (-x)/(x to the power of 2+1)
- -x/x^2+1
- (-x) divide by (x^2+1)
- (-x)/(x^2+1)dx
-
Similar expressions
- (-x)/(x^2-1)
- (x)/(x^2+1)
Integral of (-x)/(x^2+1) dx
The solution
You have entered
[src]
1 / | | -x | ------ dx | 2 | x + 1 | / 0
$$\int\limits_{0}^{1} \frac{\left(-1\right) x}{x^{2} + 1}\, dx$$
Integral((-x)/(x^2 + 1), (x, 0, 1))
Detail solution
We have the integral:
/ | | -x | ------ dx | 2 | x + 1 | /
Rewrite the integrand
/ 2*x \
|------------| /0\
| 2 | |-|
-x \x + 0*x + 1/ \1/
------ = - -------------- + ---------
2 2 2
x + 1 (-x) + 1or
/ | | -x | ------ dx | 2 = | x + 1 | /
/
|
| 2*x
- | ------------ dx
| 2
| x + 0*x + 1
|
/
--------------------
2 In the integral
/
|
| 2*x
- | ------------ dx
| 2
| x + 0*x + 1
|
/
--------------------
2 do replacement
2 u = x
then
the integral =
/
|
| 1
- | ----- du
| 1 + u
|
/ -log(1 + u)
------------- = ------------
2 2 do backward replacement
/
|
| 2*x
- | ------------ dx
| 2
| x + 0*x + 1
| / 2\
/ -log\1 + x /
-------------------- = -------------
2 2 In the integral
0
do replacement
v = -x
then
the integral =
True
do backward replacement
True
Solution is:
/ 2\
log\1 + x /
C - -----------
2
The answer (Indefinite)
[src]
/ | / 2\ | -x log\1 + x / | ------ dx = C - ----------- | 2 2 | x + 1 | /
$$\int \frac{\left(-1\right) x}{x^{2} + 1}\, dx = C - \frac{\log{\left(x^{2} + 1 \right)}}{2}$$
The graph
The answer
[src]
-log(2) -------- 2
$$- \frac{\log{\left(2 \right)}}{2}$$
=
=
-log(2) -------- 2
$$- \frac{\log{\left(2 \right)}}{2}$$
-log(2)/2
The graph
Use the examples entering the upper and lower limits of integration.