Mindrust Posted May 20, 2011 Posted May 20, 2011 (edited) Find the nth derivative of sqr(2x-1). That means we need to find a pattern. Here's what I've got so far, from 1st derivative to 5th: The pattern for the exponent is simple, 1/2 - n The pattern for the co-efficient is what I'm stuck on. Here's what it looks like. I'm not sure how to express it mathematically. 1 -> 1 = 1 2 -> -1 = 1(-1) 3 -> 3 = 1(-1)(-3) 4 -> -15 = 1(-1)(-3)(-5) 5 -> 105 = 1(-1)(-3)(-5)(-7) and so on... Anyone know how to make a function for the coefficient in terms of n? Edited May 20, 2011 by Mindrust
DrRocket Posted May 20, 2011 Posted May 20, 2011 Find the nth derivative of sqr(2x-1). That means we need to find a pattern. Here's what I've got so far, from 1st derivative to 5th: The pattern for the exponent is simple, 1/2 - n The pattern for the co-efficient is what I'm stuck on. Here's what it looks like. I'm not sure how to express it mathematically. 1 -> 1 = 1 2 -> -1 = 1(-1) 3 -> 3 = 1(-1)(-3) 4 -> -15 = 1(-1)(-3)(-5) 5 -> 105 = 1(-1)(-3)(-5)(-7) and so on... Anyone know how to make a function for the coefficient in terms of n? [math] \frac{d}{dx} (2x-1)^{\frac{1}{2}} = (2x-1)^{\frac {-1}{2}}[/math] [math] \frac{d^2}{dx^2} (2x-1)^{\frac{1}{2}} = -(2x-1)^{\frac {-3}{2}}[/math] [math]\frac{d^3}{dx^3} (2x-1)^{\frac{1}{2}} = 3(2x-1)^{\frac {-5}{2}}[/math] . . . [math]\frac{d^n}{dx^n} (2x-1)^{\frac{1}{2}} = ( (-1)^{n}\displaystyle\prod_{k=0}^{n-1} (2k-1) )(2x-1)^{\frac {-2n+1}{2}} [/math]
Mindrust Posted May 20, 2011 Author Posted May 20, 2011 (edited) Thanks. BTW, what does that big "pi" looking symbol mean? Edited May 20, 2011 by Mindrust
DJBruce Posted May 20, 2011 Posted May 20, 2011 (edited) Thanks. BTW, what does that big "pi" looking symbol mean? It is similar to summation notation, but instead of adding each terms you are going to multiply them together. So for example, [math]\prod_{k=1}^n \frac{1}{x_{k}}=1*\frac{1}{2}*\frac{1}{3}*...*\frac{1}{n} [/math] Edited May 20, 2011 by DJBruce
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