(one + n)^ two *Abs(sin(x*n)/sin(x*(one + n)))/n^ two
(1 plus n) squared multiply by Abs( sinus of (x multiply by n) divide by sinus of (x multiply by (1 plus n))) divide by n squared
(one plus n) to the power of two multiply by Abs( sinus of (x multiply by n) divide by sinus of (x multiply by (one plus n))) divide by n to the power of two
(1 + n)2*Abs(sin(x*n)/sin(x*(1 + n)))/n2
1 + n2*Abssinx*n/sinx*1 + n/n2
(1 + n)²*Abs(sin(x*n)/sin(x*(1 + n)))/n²
(1 + n) to the power of 2*Abs(sin(x*n)/sin(x*(1 + n)))/n to the power of 2
(1 + n)^2Abs(sin(xn)/sin(x(1 + n)))/n^2
(1 + n)2Abs(sin(xn)/sin(x(1 + n)))/n2
1 + n2Abssinxn/sinx1 + n/n2
1 + n^2Abssinxn/sinx1 + n/n^2
(1 + n)^2*Abs(sin(x*n) divide by sin(x*(1 + n))) divide by n^2
