Integration Help ! (1 Viewer)

Nah_f_u_studies · Aug 8, 2011

Hi Guys ,

The question is:

Integrate 3/x

and the marking notes said that you need to use log function.

It may b easy bt i need help plz !

Thnx

SpiralFlex · Aug 8, 2011

$\int \frac{3}{x} \:\mathrm{d} x$

To make it easy, take the constant out,

$3 \int \frac{1}{x}\: \mathrm{d} x$

$3\ln |x| + C$

Nah_f_u_studies · Aug 8, 2011

Howd you do that ?

I kinda suck at log functions ... lol

_deloso · Aug 8, 2011

Nah_f_u_studies said:
Howd you do that ?

I kinda suck at log functions ... lol

The derivative of a log function is log(x)= f(x)/ f'(x) so in your case, you would do the opposite. But the derivative of x isn't 3... however 3 is a constant therefore you can "take it out" of the function like the post above. Thus 3/x can also become 3 times 1/x. Now the derivative of x is 1. Therefore the integral of 1/x is a log function.. so log(x) but the three is still there. you would include that in the answer to become 3log(x)... oh and dont forget the constant. so 3log(x) + c

SpiralFlex · Aug 8, 2011

Nah_f_u_studies said:
Howd you do that ?

I kinda suck at log functions ... lol

The definition of a logarithmic integral,

$\frac{\mathrm{d} }{\mathrm{d} x}\log_{a}f(x)=\frac{f'(x)}{f(x)}*\log_{a}e$ [Assuming $a \neq e$ ]

Now,

$\frac{\mathrm{d} }{\mathrm{d} x}\log_{e}f(x)=\frac{f'(x)}{f(x)}*\log_{e}e$

$\frac{\mathrm{d} }{\mathrm{d} x} \ln x=\frac{f'(x)}{f(x)}$

So hence if we integrate,

$\int \frac{f'(x)}{f(x)} \: \mathrm{d} x = \ln|x|+C$

I put the absolute brackets since the logarithm is only defined for anything above 0.

With your form,

$3 \int \frac{1}{x}\: \mathrm{d} x$

Since the top is the derivative of the bottom, which is -

$\frac{f'(x)}{f(x)}$

We can integrate directly,

$=3\ln |x| + C$

Nah_f_u_studies · Aug 8, 2011

_deloso said:
The derivative of a log function is log(x)= f(x)/ f'(x) so in your case, you would do the opposite. But the derivative of x isn't 3... however 3 is a constant therefore you can "take it out" of the function like the post above. Thus 3/x can also become 3 times 1/x. Now the derivative of x is 1. Therefore the integral of 1/x is a log function.. so log(x) but the three is still there. you would include that in the answer to become 3log(x)... oh and dont forget the constant. so 3log(x) + c

Thank You !!

SpiralFlex · Aug 8, 2011

_deloso said:
The derivative of a log function is log(x)= f(x)/ f'(x) so in your case, you would do the opposite. But the derivative of x isn't 3... however 3 is a constant therefore you can "take it out" of the function like the post above. Thus 3/x can also become 3 times 1/x. Now the derivative of x is 1. Therefore the integral of 1/x is a log function.. so log(x) but the three is still there. you would include that in the answer to become 3log(x)... oh and dont forget the constant. so 3log(x) + c

Other way. HSC stress?

_deloso · Aug 8, 2011

SpiralFlex said:
Other way. HSC stress?

lol yup my bad. give me a break. got physics tomorrow

SpiralFlex · Aug 8, 2011

_deloso said:
lol yup my bad. give me a break. got physics tomorrow

I shall get some motors for you to study!

Integration Help ! (1 Viewer)

Nah_f_u_studies

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SpiralFlex

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Nah_f_u_studies

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_deloso

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Nah_f_u_studies

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_deloso

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