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 (15x^(2)-5x-8x^(-2)) | | Derivative of (6x^(2)-12x+2)e^(x) | | Derivative of ln(8x^(6)+5x)^(8/5) | | Derivative of (2x+4) | | Derivative of (x+(2/x))^4 | | Derivative of 4/x^3 | | Derivative of 30(1/3m-3/5n)-20(3/4m+2/5n) | | Derivative of (x+2/x) | | Derivative of 1/2x+2/31/3x-3/2 | | Derivative of (x+2/x)^4 | | Derivative of e^(cos(5x)) | | Derivative of x^2+2x/x^2-1 | | Derivative of (e^(-3x))(cos(0.5x)) | | Derivative of cos(0.5x) | | Derivative of (2x^2+3x)(1+x)^0.5 | | Derivative of (1+x)^0.5 | | Derivative of (1+x)^1/2 | | Derivative of 2x^2-14x | | Derivative of sin(x^2)+2 | | Derivative of e^x | | Derivative of 2x*cos(x^2) | | Derivative of e^2x | | Derivative of e^(2x) | | Derivative of x^4 | | Derivative of cos(x)^2 | | Derivative of (x-1)^2 | | Derivative of (x-1)^1/2 | | Derivative of (x-1)^(1/2) | | Derivative of 3m^(-4)/(m^3) | | Derivative of 1x+6x-2x | | Derivative of (x+1)/(x-1) |