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How would I convert the following formula to php to solve for "p":

(1-p)^365=.80

What I'm trying to do is calculate the daily probability of an event based on the annual probability. For example, let's say the likelihood that John Doe is going to die in a particular year is 20%. So what would be the likelihood on any given day of that year? I know the answer for that example scenario is 0.0611165 using the formula above (where .80 is the 80% annual survival probability). What I need is a formula in which I can substitute various annual probabilities and the result would be the corresponding daily probabilities.

Can anyone help?

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1  
If y is the yearly probability then p = 1 - y^365. This is also a math question, which is off topic for SO. –  erisco Oct 6 '11 at 2:13

2 Answers 2

To solve for p you need to take the 365-th root of both sides, then solve for p.

<?php
  $prob = 0.80;
  $p = 1 - pow($prob, 1/365);
?>
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Well you'd take the 365th root of both sides which is equivalent to raising to the 1/365

<?php
    $prob = 0.80;
    $prob = pow($prob, 1/365);

then you'd add 1

    $p = $prob + 1;
    echo $p;
?>
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1  
^ is a bitwise XOR, not an exponent. You probably meant pow(), but then the equation is still not correct. –  jasonbar Oct 6 '11 at 2:00
    
thanks @jasonbar Fixed the pow. I misread the solve for p. Rewriting. –  Brombomb Oct 6 '11 at 2:04
1  
That's the wrong variable. I know what $prob will be in every instance. What I don't know is what $p will be. So the answer needs to be along the lines of $p = ?. –  David Feld Oct 6 '11 at 2:06

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