Derivative of e^(7*x)*sin(3*x)
Instant step-by-step solution for e^(7*x)*sin(3*x)
How to find the derivative of e^(7*x)*sin(3*x)
To find the derivative of e^(7*x)*sin(3*x), we use standard differentiation rules. Our AI-powered calculator breaks down the steps and explains the logic.
Practice More Problems
Integral of 5*1/x + 4*sec(x)^2
Solve d/dx 5*1/x + 4*sec(x)^2
Derivative of atan(7*x)
Solve d/dx atan(7*x)
Limit of (1/5*cos(x)) - (1/5*ln(x))
Solve d/dx (1/5*cos(x)) - (1/5*ln(x))
Limit of (sin(x) * ln(x)) / x^2
Solve d/dx (sin(x) * ln(x)) / x^2
Limit of (2*cos(x) * sqrt(x)) / tan(x)
Solve d/dx (2*cos(x) * sqrt(x)) / tan(x)
Limit of (3*e^x - 1/(x^2)) / (sqrt(x) - x^3)
Solve d/dx (3*e^x - 1/(x^2)) / (sqrt(x) - x^3)
Derivative of e^(4*x)*sin(2*x)
Solve d/dx e^(4*x)*sin(2*x)
Derivative of (3*x+2)^5
Solve d/dx (3*x+2)^5
Integral of 1/2*sin(x) + 4*sec(x)^2
Solve d/dx 1/2*sin(x) + 4*sec(x)^2
Integral of 4*tan(x) + 3*sec(x)^2 + 3*sin(x)
Solve d/dx 4*tan(x) + 3*sec(x)^2 + 3*sin(x)