300 = π/3. $h^{2}$ . (12 − h)
10y*e^(-x^2 - y^2) * (1-2x^2)
x = 1/root2, y = 1/root2
Hence, find the value of k and of h if the symmetrical axis is at1x h= − .
2 $$\int_{\Box}^{\Box}(\Box) d\Box$$ + $$\prod_{a}^{b}{C}$$ $$\int_{\Box}^{\Box}(\Box) d\Box$$ $\sqrt{\Box}$ $$\sum_{a}^{b}{C}$$...
Given that y = ca^(-kt) , express t in terms of y , c and k
By using the completing of the square method, express h in terms of k .
Simplify
(16x^16)^3/4
Given that y = Ca^(-kt) , express t in terms of y , c and k
Given that y = Ca^-kt , express t in terms of y , c and k
3x(2x²5x-4)