Integration of Exponential Functions (1 Viewer)

Dragie

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Could someone simplistically explain the method of integrating an exponential? I've tried to understand and I've read a lot of sources but it wont sink in. Would anyone care to explain? Thank you so much!
 

insert-username

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If the derivative of ex is ex, then it follows that its integral is also ex. This, along with the chain rule is all you probably need to know to integrate exponential functions:

∫e2x+1dx

If we finish with e2x+x, we must have started with e2x+1, since the derivative of ex is ex. However:

d/dx(e2x+1) = 2e2x+1 (chain rule)

This is double what we want to end up with, so we add a half to balance the coefficients:

∫e2x+1dx

= 1/2e2x+1


Just remember that when you integrate you need to end up with something that differentiates to get the original function.


I_F
 

Dragie

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Hey thank you so much to both of you but I just need help with one more question:


1. Evaluate this definite integral:
1
∫ e^3x dx
0

2. Evaluate this definite integral:
2
∫ 1/2(e^x + e^-x)dx
0

I'm slowly getting it but I think I need a bit more...
 
P

pLuvia

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1
∫ e^3x dx
0

= [1/3*e3x ] Stick in the limits and you should get answer

2
∫ 1/2(e^x + e^-x)dx
0

= 1/2 [ ex - e-x ] Stick in the limits and you should get the answer
 

Dragie

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pLuvia said:
1
∫ e^3x dx
0

= [1/3*e3x ] Stick in the limits and you should get answer

2
∫ 1/2(e^x + e^-x)dx
0

= 1/2 [ ex - e-x ] Stick in the limits and you should get the answer


Oh is that it? Haha I've been killing myself over integration of these functions for a few days and I just got it! Lol damn I'm slow sometimes.
 

Dragie

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2 more questions I promise!! How would these be done:

1.
x^2.e^({2x^3}+1)

2.
2x/(e^X^2)


It's really hard to type these out - does anyone know how to superscript on here:p
 
P

pLuvia

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I assume integrate them?

∫ x2e2x3+1 dx
Let u=2x3+1
du = 6x2 dx

=1/6 ∫ 6x2eu dx
=1/6 ∫ eudu
=1/6[eu]
=1/6*e2x3+1+C

∫ 2x/(ex2)
Let u=x2
du=2xdx
= ∫ 2x/eudx
= ∫ du/eu
= [-e-u]
= -1/ex2+C

To use superscript use this code

[sup ]Insert Text[/sup ]

With subscript

[sub ]Insert Text[/sub]
 

Riviet

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General rule:

∫f'(x)ef(x) dx
let u=f(x)
du/dx = f'(x)
du = f'(x) dx
substitute u and du into your original integral:
∫f'(x)ef(x) dx = ∫ eu du
= eu + C

Remember to manipulate constants to get your integral into the form f'(x)ef(x)
 

Rax

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Differentiating exponentials, You differentiate the power and multiply it by the original exponential

Integrating exponentials, Differentiate the power and DIVIDE the original exponential by the derivative

Done and Done
 

imranium

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I assume integrate them?

∫ x2e2x3+1 dx
Let u=2x3+1
du = 6x2 dx

=1/6 ∫ 6x2eu dx
=1/6 ∫ eudu
=1/6[eu]
=1/6*e2x3+1+C

∫ 2x/(ex2)
Let u=x2
du=2xdx
= ∫ 2x/eudx
= ∫ du/eu
= [-e-u]
= -1/ex2+C

To use superscript use this code

[sup ]Insert Text[/sup ]

With subscript

[sub ]Insert Text[/sub]


----------------------------------


wooww.. hold on a sec. so where does the x^2 from (∫ x<sup>2</sup>e<sup>2x<sup>3</sup>+1</sup> dx) go?????????????????????????
 

dakiu

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