(one + n)^ four *Abs(cos(two *pi*n)/cos(pi*(two + two *n)))/n^ four
(1 plus n) to the power of 4 multiply by Abs( co sinus of e of (2 multiply by Pi multiply by n) divide by co sinus of e of ( Pi multiply by (2 plus 2 multiply by n))) divide by n to the power of 4
(one plus n) to the power of four multiply by Abs( co sinus of e of (two multiply by Pi multiply by n) divide by co sinus of e of ( Pi multiply by (two plus two multiply by n))) divide by n to the power of four
(1 + n)4*Abs(cos(2*pi*n)/cos(pi*(2 + 2*n)))/n4
1 + n4*Abscos2*pi*n/cospi*2 + 2*n/n4
(1 + n)⁴*Abs(cos(2*pi*n)/cos(pi*(2 + 2*n)))/n⁴
(1 + n)^4Abs(cos(2pin)/cos(pi(2 + 2n)))/n^4
(1 + n)4Abs(cos(2pin)/cos(pi(2 + 2n)))/n4
1 + n4Abscos2pin/cospi2 + 2n/n4
1 + n^4Abscos2pin/cospi2 + 2n/n^4
(1 + n)^4*Abs(cos(2*pi*n) divide by cos(pi*(2 + 2*n))) divide by n^4
