x^(4)-1

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lim_ (x rarr oo) ((x + 1) ^ (4) - (x-1) ^ (4)) / ((x + 1) ^ (4) + (x-1) ^ (4))

If (x)={3^(x),-1<=x<=1,4-x,1

If x is an integer, then (x + 1)^(4) - (x-1)^(4) is always divisible by

Solve for x in (4x-1)/(4x+1)+(4x+1)/(4x-1)=(10)/(3)

If x is an integer, then (x +1) ^(4) – (x -1) ^(4) is always divisible by

f(x) = 1/(4x-1) in [1,4]

The number of real roots of (x-1)^(4)+(x+1)^(4)=16 is

int((x-1)^(4))/((x+1)^(4))dx

(3) / (x + 1) + (4) / (x-1) = (29) / (4x-1); x! = 1, -1, (1) / (4)

(x-1)^4+4(x-1)^3+6(x-1)^2+4 (x-1)+1 = ?