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Exponential and Logarithmic Functions (1 Viewer)

FDownes

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Damn, I hate it when I get stuck on a question that should be incredibly simple. Can someone quickly help me out of this? Here's the question;

If log72 = 0.36 and log73 = 0.56, find the value of log714 and the value of log73.5.
 
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hahaha i can be about the biggest idiot.
guess u can discount everything i just sed
minds on english
sorry
 

FDownes

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No worrys, thanks anyway. :)

EDIT: Oh, and BTW, I'm stuck on the next problem too. I'll add it to the opening post.
 
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midifile

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tacogym27101990 said:
If log<sub>7</sub>2 = 0.36 and log<sub>7</sub>3 = 0.56, find the value of log<sub>7</sub>14.

14 is 9 +4
so u use your log laws
log<sub>7</sub>14 = log<sub>7</sub>9 + log<sub>7</sub>4
= log<sub>7</sub>3<sup>2</sup> + log<sub>7</sub>2<sup>2</sup>
=2log<sub>7</sub>3 + 2log<sub>7</sub>2
=2*0.36 + 2*0.56
=1.84
.... I hope
Your first log law is wrong :(
When you add two logs you times their numbers, so log<sub>7</sub>9 + log<sub>7</sub>4 = log<sub>7</sub>(4x9) = log<sub>7</sub>36.... plus either way, 14 = 9 + 5 not 9 + 4 :p

However what you can do is say:
log<sub>7</sub>14 = log<sub>7</sub>(2x7)
= log<sub>7</sub>2 + log<sub>7</sub>7
= 0.36 + 1 (because log<sub>a</sub>a = 1)
= 1.36
... I think thats right. I dont know what you needed the log<sub>7</sub>3 for
 

FDownes

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Oooooooooooooooh... I can't believe I didn't think of that!

Thanks a heap! :)
 

midifile

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FDownes said:
Oooooooooooooooh... I can't believe I didn't think of that!

Thanks a heap! :)
no worries.

The other one is log<sub>7</sub>(7/2) = log<sub>7</sub>7 - log<sub>7</sub>2
= 1 - 0.36
= 0.64
 

Mark576

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Q. If log72 = 0.36 and log73 = 0.56, find the value of log714.

log714 = log7(2*7) = log72+log77 = 1+0.36 = 1.36
 

FDownes

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Ugh... I'm having a bad time with these questions. Here's another one;

Find the area enclosed between the curve y = ln x, the y-axis and the lines y = 1 and y = 3.
 

webby234

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x = ey (Make the subject x because you're finding area between y axis and curve)

So integrate that from 1 to 3.

Int(eydy)
= ey
= e3 - e
 

FDownes

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Okay, new question;

Find the exact gradient of the tangent to the curve y = ex + logex at the point where x = 1.

This is my working;
= y' = 1/x * ex + logex
= m = 1/(1) * e(1) + loge(1)
= m = 1 * e1 + 1
= m = e2

Only according to the book, that's wrong. According to it, the answer should be 2e. Where have I gone wrong?
 

Mark576

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y = ex + logex
y' = (1+1/x)ex + logex
At x = 1;
y' = 2e1 + loge1 = 2e, since loge1 = 0.
 

FDownes

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Whoops, silly mistake. I was thinking loge1 = 1. :rolleyes:

Thanks.
 

FDownes

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Another one;

Use simpson's rule with 5 function values to find the volume of the solid formed when the curve y = ex is rotated about the y-axis from y = 3 to y = 5, correct to 2 significant figures.

My problem isn't so much in applying simpsons rule (that's really just substituting values in to a formula, not really very hard) but in figuring out how to get x2 from ex. I'm sure its fairly simple, but could someone explain?
 

cwag

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y = ex

from the definition of a log. we find loga b = c changes to ac = b

therefore.. loge y = x
therefore x2 = (ln y)2
 

FDownes

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Ah... Right. Silly mistake again. :eek:

EDIT: Hmm... How would I go about integrating (ln y)2? Would it be 1/2(ln y) or am I completely off the track?

EDIT x 2: Oh crap, I'm completely forgetting my log laws again. (ln y)2 = 2ln y, right? So how do I go about integrating that?
 
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foram

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FDownes said:
Ah... Right. Silly mistake again. :eek:

EDIT: Hmm... How would I go about integrating (ln y)2? Would it be 1/2(ln y) or am I completely off the track?

EDIT x 2: Oh crap, I'm completely forgetting my log laws again. (ln y)2 = 2ln y, right? So how do I go about integrating that?
ln y^2 = 2.ln y

but is that also true for (ln y)^2 ?
 

FDownes

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Another question;

Find ∫x2e3 - 1 dx.

Don't forget the question in my last post though, I still need help with that.

EDIT: ^ I'm really not sure. I don't suppose you could go through it...?
 

foram

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i don't think you can intergrate log, unless you use the simpsons rule or somthing like that, but thats not really intergrating.
 

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