" If "g(x)=int(0)^(x)cos^(4)tdt," then "...

" If "g(x)=int_(0)^(x)cos^(4)tdt," then "g(x+pi)" equals "

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

If g(x)=int_(0)^(x)cos^(4)t dt, then g(x+pi) equals

If g(x)=int_(0)^(x)cos^(4) dt , then g(x+pi) equals

If g(x)=int_(0)^(x)cos^(4) t dt , then (x+pi) equals

If g(x)=int_(0)^(x)cos^(4) t dt , then (x+pi) equals

Ifg(x)= int_(0)^(x) cos ^(4)t dt, "then " g (x+pi) equals

If g(x)=int_(0)^(x)cos4tdt , then g(x+pi) equals-

If g(x)=int_(0)^(x)cos^(4)t dt, then g(x+pi) equals to (a) (g(x))/(g(pi)) (b) g(x)+g(pi) (c) g(x)-g(pi) (d) g(x).g(pi)

If g(x)=int_(0)^(x)cos^(4)t dt, then g(x+pi) equals to (a) (g(x))/(g(pi)) (b) g(x)+g(pi) (c) g(x)-g(pi) (d) g(x).g(pi)

Recommended Questions

" If "g(x)=int(0)^(x)cos^(4)tdt," then "g(x+pi)" equals "
Text Solution
|
If g(x)""=int0xcos4t"dt" , then g(x""+pi) equals: (1) (g(x)/(g(pi) (2...
Text Solution
|
If f (x) = int (0) ^ (sin x) cos ^ (- 1) tdt + int (0) ^ (cos x) sin ^...
Text Solution
|
If g(x) = int(0)^(x) cos dt, then g(x+pi) equals
Text Solution
|
If g(x)=int(0)^(x)cos^(4)t dt, then prove that g(x+pi)=g(x)+g(pi).
Text Solution
|
If g(x)=int(0)^(x)cos^(4)t dt, then g(x+pi) equals
Text Solution
|
If g(x)=int(0)^(x)cos^(4) dt , then g(x+pi) equals
Text Solution
|
Ifg(x)= int(0)^(x) cos ^(4)t dt, "then " g (x+pi) equals
Text Solution
|
यदि g(x) = int(0)^(x) cos 4t dt , तो g(pi+x) बराबर है :
Text Solution
|