The concept of Derivative is at the core of Calculus and modern mathematics. The definition of the derivative can be approached in two different ways. One is geometrical (as a slope of a curve) and the other one is physical (as a rate of change). We can calculate it for you.
| Derivative of 4e^u |
| Derivative of sin(4)t |
| Derivative of e^-2*0.5 |
| Derivative of x*e^-1/x |
| Derivative of 0.2^(3x) |
| Derivative of 900/(x^2) |
| Derivative of e^-7x^2-3x |
| Derivative of (1/2ln(2))*x |
| Derivative of (e^x)(x-6) |
| Derivative of 4sin(5y) |
| Derivative of s/x |
| Derivative of sin(4x-2) |
| Derivative of 36-x^2 |
| Derivative of cos(z^2) |
| Derivative of 2(cos(2z)) |
| Derivative of (Pi-x)/24 |
| Derivative of 3e^(x-3) |
| Derivative of 4*sin(x/2) |
| Derivative of -3cos(t)sin(t) |
| Derivative of (sin(pi*x))^2 |
| Derivative of -8e^(-2x) |
| Derivative of -16e^(-2x) |
| Derivative of 10000-1600x |
| Derivative of 10000-1600p |
| Derivative of 6x^(3) |
| Derivative of 4x^23 |
| Derivative of 13x^3 |
| Derivative of 1(sin(x)) |
| Derivative of (pi/5) |
| Derivative of 450000/x |
| Derivative of 2x^pi |