(2)(16)/(x)-1=(15)/(x+1),x!=0,-1

Solve for x:(16)/(x)-1=(15)/(x+1),x!=0,-1

Solve by factorization: (16)/(x)-1=(15)/(x+1);x!=0,-1

Solve each of the following quadratic equations: (16)/(x)-1=(15)/(x+1),xne0,-1

Solve for x : (16)/x-1=(15)/(x+1),\ \ x!=0,\ -1

Solve by factorization: (16)/x-1=(15)/(x+1);\ \ x!=0,\ -1

(x)/(x+1)+(x+1)/(x)=(34)/(15),(x!=0,-1)

If x is rational and 4(x^(2)+(1)/(x^(2)))+16(x+(1)/(x))-57=0 , then the product of all possible values of x is

If x is rational and 4(x^(2)+(1)/(x^(2)))+16(x+(1)/(x))-57=0 , then the product of all possible values of x is

The coefficient of x^(3) in the infinite series expansion of (2)/((1-x)(2-x)), for |x|<1 is (A)-(1)/(16)(B)(15)/(8)(C)-(1)/(8)(D)(15)/(16)

(e^(x)x^(16)(1-x)^(1001)(2-x)^(1003))/((x-(1)/(x))^(2017)(x+(1)/(x))^(2006)(x^(2)-x+1))<0