matcad Messages 3 Reaction score 0 Thread starter Dec 5, 2008 #1 Homework Statement -x<sin(x)<x Homework Equations show the inequality using the mean value theorem. The Attempt at a Solution i try to find c but i keep getting tan(x) as the solution.
Homework Statement -x<sin(x)<x Homework Equations show the inequality using the mean value theorem. The Attempt at a Solution i try to find c but i keep getting tan(x) as the solution.
gabbagabbahey Homework Helper Gold Member Messages 5,000 Reaction score 7 Dec 5, 2008 #2 If you show me what you've tried, I can help you better.
matcad Messages 3 Reaction score 0 Dec 5, 2008 #3 i had: f(x)=sin(x) a=-x b=x f(x)-f(-x)= f'(c) (x+x) sin(x) = sin(x)=cos(c) (2x) 2sin(x)=2cos(xc) tan(x)=c i don't know if that's right, but i don't get the result. i would appreciate your help.
i had: f(x)=sin(x) a=-x b=x f(x)-f(-x)= f'(c) (x+x) sin(x) = sin(x)=cos(c) (2x) 2sin(x)=2cos(xc) tan(x)=c i don't know if that's right, but i don't get the result. i would appreciate your help.
gabbagabbahey Homework Helper Gold Member Messages 5,000 Reaction score 7 Dec 5, 2008 #4 First, [itex]2x \cos (c) \neq 2 \cos(cx)[/itex] and second [tex]\frac{\cos(cx)}{\cos (x)}\neq c[/tex]! Try again, but this time use a=0 and b=x. What do you know about the maximum and minimum values of cosine of any number?
First, [itex]2x \cos (c) \neq 2 \cos(cx)[/itex] and second [tex]\frac{\cos(cx)}{\cos (x)}\neq c[/tex]! Try again, but this time use a=0 and b=x. What do you know about the maximum and minimum values of cosine of any number?
matcad Messages 3 Reaction score 0 Dec 6, 2008 #5 ok, now i got: f(x)=sin(x) a=0 b=x f(x)-f(0)= f'(c) (x-0) sin(x) =cos(c) (x) sin(x)/x=cos(c) im stucked there... i don't know what you mean with the the maximum and minimum values of cosine of any number.
ok, now i got: f(x)=sin(x) a=0 b=x f(x)-f(0)= f'(c) (x-0) sin(x) =cos(c) (x) sin(x)/x=cos(c) im stucked there... i don't know what you mean with the the maximum and minimum values of cosine of any number.
gabbagabbahey Homework Helper Gold Member Messages 5,000 Reaction score 7 Dec 6, 2008 #6 Well, cosine is a periodic function that is never greater than 1 or less than negative 1...ring a bell? That means that [itex]-1\leq \cos (c) \leq 1[/itex] and so...
Well, cosine is a periodic function that is never greater than 1 or less than negative 1...ring a bell? That means that [itex]-1\leq \cos (c) \leq 1[/itex] and so...