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- Improper integral
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How to use it?
- Integral of d{x}:
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Integral of 1/(1+4x^2)
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Integral of dx/(4x-1)
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Integral of (2x+3)/(x^2-5x+6)
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Integral of 2x(x^2+1)
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Identical expressions
- (two x+ three)/(x^2-5x+ six)
- (2x plus 3) divide by (x squared minus 5x plus 6)
- (two x plus three) divide by (x squared minus 5x plus six)
- (2x+3)/(x2-5x+6)
- 2x+3/x2-5x+6
- (2x+3)/(x²-5x+6)
- (2x+3)/(x to the power of 2-5x+6)
- 2x+3/x^2-5x+6
- (2x+3) divide by (x^2-5x+6)
- (2x+3)/(x^2-5x+6)dx
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Similar expressions
- (2x+3)/(x^2-5x-6)
- (2x-3)/(x^2-5x+6)
- (2x+3)/(x^2+5x+6)
Integral of (2x+3)/(x^2-5x+6) dx
The solution
You have entered
[src]
1 / | | 2*x + 3 | ------------ dx | 2 | x - 5*x + 6 | / 0
$$\int\limits_{0}^{1} \frac{2 x + 3}{\left(x^{2} - 5 x\right) + 6}\, dx$$
Integral((2*x + 3)/(x^2 - 5*x + 6), (x, 0, 1))
The answer (Indefinite)
[src]
/ | | 2*x + 3 | ------------ dx = C - 7*log(-2 + x) + 9*log(-3 + x) | 2 | x - 5*x + 6 | /
$$\int \frac{2 x + 3}{\left(x^{2} - 5 x\right) + 6}\, dx = C + 9 \log{\left(x - 3 \right)} - 7 \log{\left(x - 2 \right)}$$
The graph
The answer
[src]
-9*log(3) + 16*log(2)
$$- 9 \log{\left(3 \right)} + 16 \log{\left(2 \right)}$$
=
=
-9*log(3) + 16*log(2)
$$- 9 \log{\left(3 \right)} + 16 \log{\left(2 \right)}$$
-9*log(3) + 16*log(2)
The graph
Use the examples entering the upper and lower limits of integration.