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- Improper integral
- Double Integral
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How to use it?
- Integral of d{x}:
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Integral of exp(-x^2)
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Integral of -x
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Integral of ln^2(x)
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Integral of sin^2
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Identical expressions
- (e^(-((x- two)^ two)/ two))/sqrt(two *pi)
- (e to the power of ( minus ((x minus 2) squared ) divide by 2)) divide by square root of (2 multiply by Pi )
- (e to the power of ( minus ((x minus two) to the power of two) divide by two)) divide by square root of (two multiply by Pi )
- (e^(-((x-2)^2)/2))/√(2*pi)
- (e(-((x-2)2)/2))/sqrt(2*pi)
- e-x-22/2/sqrt2*pi
- (e^(-((x-2)²)/2))/sqrt(2*pi)
- (e to the power of (-((x-2) to the power of 2)/2))/sqrt(2*pi)
- (e^(-((x-2)^2)/2))/sqrt(2pi)
- (e(-((x-2)2)/2))/sqrt(2pi)
- e-x-22/2/sqrt2pi
- e^-x-2^2/2/sqrt2pi
- (e^(-((x-2)^2) divide by 2)) divide by sqrt(2*pi)
- (e^(-((x-2)^2)/2))/sqrt(2*pi)dx
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Similar expressions
- (e^(-((x+2)^2)/2))/sqrt(2*pi)
- (e^(((x-2)^2)/2))/sqrt(2*pi)
Integral of (e^(-((x-2)^2)/2))/sqrt(2*pi) dx
The solution
You have entered
[src]
2 / | | 2 | -(x - 2) | ---------- | 2 | E | ----------- dx | ______ | \/ 2*pi | / -oo
$$\int\limits_{-\infty}^{2} \frac{e^{\frac{\left(-1\right) \left(x - 2\right)^{2}}{2}}}{\sqrt{2 \pi}}\, dx$$
Integral(E^((-(x - 2)^2)/2)/sqrt(2*pi), (x, -oo, 2))
The answer (Indefinite)
[src]
/ | / / \ | 2 | | | | -(x - 2) | | 2 | | ---------- | | -x | | 2 ___ | | ---- | | E \/ 2 | | 2*x 2 | -2 | ----------- dx = C + --------*| | e *e dx|*e | ______ ____ | | | | \/ 2*pi 2*\/ pi \/ / | /
$$\int \frac{e^{\frac{\left(-1\right) \left(x - 2\right)^{2}}{2}}}{\sqrt{2 \pi}}\, dx = C + \frac{\frac{\sqrt{2}}{2 \sqrt{\pi}} \int e^{2 x} e^{- \frac{x^{2}}{2}}\, dx}{e^{2}}$$
The graph
The graph
Use the examples entering the upper and lower limits of integration.