View Full Version : A bit of Calculus...
qwertysaur
10-08-2008, 03:50 PM
OK this is more of an algebra problem but Derivatives makes it Calculus!
prove that the derivative f'(x) of
f(x) = sin(x) = cos(x)
I get the whole
(sin(x + h) - sin(x))/h but I have no idea what to do after that. :(
Tavrobel
10-08-2008, 09:21 PM
If you're finding the derivative, then this definition comes with one important stipulation: the Limit as h --> 0.
What you can do here is use the trig identity that the sin(x*h) is sin(x)cos(h) + cos(x)sin(h). Go from there. The h on the bottom should drop out of the equation.
EDIT for solution: If we use the limit definition of a function for a derivative as follows:
f'(x) = Lim h-->0 (f(x+h) - f(x))/h
f'(x) = Lim h-->0 (sin(x+h) - sin(x))/h
But we know that the sin function has a trigonometric identity. sin(a*b) = sin(a)cos(b) + cos(a)sin(b). The variables a and b can be substituted for the values, x and h.
sin(x*h) = sin(x)cos(h) + cos(x)sin(h)
Substitute that mess for sin(x*h).
f'(x) = Lim h-->0 (sin(x)cos(h) + cos(x)sin(h) - sin(x))/h
Special angles are possible to use, but you won't get rid of the h on the bottom, the effective 0. Factor out sin(x).
f'(x) = Lim h-->0 (sin(x)(cos(h) -1) + (cos(x)sin(h))/h
Now we can use some special angles. sin(h) = 0; cos(h) = 1, because h = 0.
f'(x) = Lim h-->0 (sin(x)(cos(h) -1) + (cos(x)sin(h))/h
Special limits. Lim x--> 0 (cos(x)-1)/x = 0; sin(x)/x = 1.
f'(x) = Lim h-->0 of 0 + (1)cos(x)
f'(sin(x)) = cos(x)
qwertysaur
10-08-2008, 09:41 PM
thank you so much!
I knew I forgot some sort of trig property.
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