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  Discussion about math, puzzles, games and fun.   Useful symbols: √ ∞ ≠ ≤ ≥ ≈ ⇒ ∈ Δ θ ∴ ∑ ∫ π -

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Topic review (newest first)

Zach
2007-10-25 20:49:49

[ M-m-m-m-MOVED! ]

TheDude
2007-10-25 12:51:14

Better late than never:

This isn't really a coding problem, but here's the method anyway.  From the original equation we know a couple facts about A and h.  First, we know that A > 0 (strictly greater than) because ln is undefined for values of A <= 0.  For the same reason we know that h > 0.  However, we also know that 1 - h > 0, which implies h < 1 (again, strictly).   This gives us A > 0 and 0 < h < 1.

Now, we first simplify the equation by combining the logs on the right side.  ln(a) - ln(b) = ln(a / b) is a logarithmic identity, so we get ln(A) = ln(h / (1 - h) ).

Now, since the exponential function is continuous over the real numbers we can take the exponential of both sides to remove the logs and get A = h / (1 - h).

From here on out it's just algebra, but for the sake of completeness I'll go step by step.  Since we know both A and h are strictly greater than 0 we can take the reciprocal of both sides to give us 1 / A = (1 - h) / h.  We then split up the fraction on the right side to get 1 / A = (1 / h) - 1.  Add 1 to give us 1 + (1 / A) = 1 / h --------> (A + 1) / A = 1 / h.  Again, A + 1 > 0, so take the reciprocal again to give us A / (A + 1) = h   QED.

TomHawk
2007-10-17 07:10:06

Need some help with this problem.  I have the answer, just don't understand how you get this answer.

Answer: h = A / (A + 1)

I would appreciate it if someone could show me the mechanics of this equation.

Thanks.

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