Let sum(r=1)^n(r^4) = f(n). Then sum(r ...

Let ` sum_(r=1)^n(r^4) = f(n)`. Then `sum_(r =1)^n (2r-1)^4` is equal to :

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

sum_(r=1)^n r (n-r +1) is equal to :

sum_(r=1)^n r (n-r +1) is equal to :

sum_(r=1)^(n)r^(3)=f(n) then sum_(r=1)^(n)(2r-1)^(3) is equal to

Let sum_(r=1)^(n) r^(6)=f(n)," then "sum_(n=1)^(n) (2r-1)^(6) is equal to

Let sum_(r=1)^(n) r^(6)=f(n)," then "sum_(n=1)^(n) (2r-1)^(6) is equal to

sum_(r=1)^n r(n-r) is equal to :

sum_(r=1)^n r(n-r) is equal to :

sum_(r = 1)^(n) r. r! is equal to

If sum_(r=1)^n I(r)=(3^n -1) , then sum_(r=1)^n 1/(I(r)) is equal to :

Recommended Questions

Let sum(r=1)^n(r^4) = f(n). Then sum(r =1)^n (2r-1)^4 is equal to :
Text Solution
|
Let sum(r=1)^(n)(r^(4))=f(n). Then sum(r=1)^(n)(2r-1)^(4) is equal to ...
Text Solution
|
sum(r=1)^(n)r^(3)=f(n) then sum(r=1)^(n)(2r-1)^(3) is equal to
Text Solution
|
If a=sum(n=r)^( oo)(1)/(r^(4)) then sum(r=1)^(oo)(1)/((2r-1)^(4))=
Text Solution
|
The valueof sum(r=1)^(n)r^(4)-sum(r=1)^(n+2)(n+1-r)^(4) is equal to
Text Solution
|
If sum(r=1)^(n)r^(4)=F(x), then prove that the value of sum(n=1)^(n)r(...
Text Solution
|
sum(r=1)^(n)r^(2)-sum(m=1)^(n)sum(r=1)^(m)r is equal to
Text Solution
|
(sum(r=1)^(n)r^(4))/(sum(r=1)^(n)r^(2)) is equal to
Text Solution
|
f(n)=sum(r=1)^(n) [r^(2)(""^(n)C(r)-""^(n)C(r-1))+(2r+1)(""^(n)C(r ))]...
Text Solution
|