`(root(3)(a^(8)))/(sqrt(a^(3)))=a^(x)` where `agt1`
In the equation above, what is the value of x?

sqrt(3p^(2)-11)-x=0 If pgt0 and x=8 in the equation above, what is the value of p?

3x + x + x + x − 3 − 2 = 7 + x + x In the equation above, what is the value of x ?

If sqrt(10+root(3)(x))=4 , then what is the value of x ?

For the equation (a^(x))/(a^(y))=a^(10) and (a^(y))^(3)=a^(x) , if agt1 , what is the value of x?

If 3 is the root of the equation x^(2)= 8x+ k= 0 then what is the value of k?

7x+3y=8 6 −3 =5 For the solution (x, y) to the system of equations above, what is the value of x − y ?

(2x ^(2) + 3x -4) (3x +2) = 6x ^(3) + ax ^(2) -6x-8 In the above equation, a is a constant. If the equation is true for all value of x, what is the value of a ?

(3+sqrt(8))^(x^(2)-2x+1)+(3-sqrt(8))^(x^(2)-2x-1)=((2)/(3-sqrt(8))) then the difference between the greatest value and the least possible value of x is:

x^2+3^(1/4)x+sqrt3=0 where alpha and beta are roots of equation then find the value of alpha^96(alpha^12-1)+beta^96(beta^12-1)