Derivative of x^sinx

The derivative of x^sinx is determined through a combination of differentiation rules, particularly using logarithmic differentiation due to its complexity. The derivative is not straightforward due to the power of x being a function of x. Here are the key concepts involved: - Exponential Function: Functions where a constant is raised to a variable power. - Logarithmic Differentiation: A technique used for differentiating functions of the form u^v, where both u and v are functions of x. - Chain Rule: Used for differentiating composite functions.

The derivative of x^sinx can be found by first taking the natural logarithm of both sides and then differentiating: y = x^sinx Take ln of both sides: ln(y) = sinx * ln(x) Differentiate using the product and chain rules: d/dx [ln(y)] = d/dx [sinx * ln(x)] (1/y) * dy/dx = cosx * ln(x) + (sinx/x) Thus, dy/dx = y * [cosx * ln(x) + (sinx/x)] Substitute y = x^sinx back in: dy/dx = x^sinx [cosx * ln(x) + (sinx/x)] This formula is valid for x > 0.

We can derive the derivative of x^sinx using logarithmic differentiation. Here's a step-by-step proof: Using Logarithmic Differentiation 1. Start with y = x^sinx. 2. Take the natural log of both sides: ln(y) = sinx * ln(x). 3. Differentiate both sides with respect to x: d/dx [ln(y)] = d/dx [sinx * ln(x)] 4. Apply the chain rule on the left and product rule on the right: (1/y) * dy/dx = cosx * ln(x) + (sinx/x) 5. Multiply both sides by y to get dy/dx: dy/dx = y * [cosx * ln(x) + (sinx/x)] 6. Substitute y = x^sinx back: dy/dx = x^sinx [cosx * ln(x) + (sinx/x)] This proves the derivative of x^sinx.

Finding higher-order derivatives of x^sinx involves repeated differentiation and can become increasingly complex. Each subsequent derivative requires careful application of the product, chain, and power rules. For the first derivative of a function, we denote it as f′(x), showing how the function changes at a given point. The second derivative, denoted as f′′(x), is derived from the first derivative, indicating the rate of change of the rate of change. Higher-order derivatives like the third, f′′′(x), and beyond continue this pattern and provide deeper insights into the function's behavior.

When x is 1, the derivative simplifies significantly because x^sinx becomes 1^sinx = 1, so the derivative is 0. When sinx is 0 (x = nπ, where n is an integer), the term cosx * ln(x) will determine the derivative's behavior because sinx/x will be zero.

Derivative: Indicates how a function changes as its input changes. Logarithmic Differentiation: A technique for differentiating functions with variable exponents. Chain Rule: A rule for differentiating composite functions. Exponential Function: A function where a constant is raised to a variable power. Product Rule: A rule used to differentiate the product of two functions.