SOLUTION: I need some help with two problems. Thanks alot.
Solve the logrithim equation. leave answer in exact form
log x = log 2x^2 -2
solve the equation
ln 4 - ln x = 20
tha
Algebra ->
Exponential-and-logarithmic-functions
-> SOLUTION: I need some help with two problems. Thanks alot.
Solve the logrithim equation. leave answer in exact form
log x = log 2x^2 -2
solve the equation
ln 4 - ln x = 20
tha
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Question 71654This question is from textbook
: I need some help with two problems. Thanks alot.
Solve the logrithim equation. leave answer in exact form
log x = log 2x^2 -2
solve the equation
ln 4 - ln x = 20
You can put this solution on YOUR website!
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I'm going to assume that the base of log is 10 for this problem.
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For the time being let's just work on . I presume you know the rules
of logarithms. equals and furthermore,
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So putting this expansion all together:
.
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Substituting this into the original problem for the term results in:
.
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On the right side, combining the two terms gives us:
.
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Subtract from both sides leaves us with:
.
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Multiply both sides by -1:
.
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Using a calculator you can find log(2) and subtract it from 2. The answer is 1.698970004.
So the equation is now:
.
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Convert this to exponential form to find that:
.
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The answer is that x = 50, but you can track the work and cut it off at the point
that you think satisfies the "exact form" asked for in the problem.
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Next problem:
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Subtract from both sides to get:
.
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Multiply the entire equation by -1
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This time the base is .
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Use a calculator to find ln(4) and once you get that, subtract 20. The result should be
-18.61370564. This makes the equation:
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Convert this to exponential form by raising to the power -18.61370564 on your calculator.
The answer you should get is
.
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Hope this helps you with your understanding of logarithms.
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