_g(x) = = /1 + sin(2x) 2x – tan(x)

use logarithmic differentiation to find the first derivative of the given functions

Transcribed Image Text:

The image contains three mathematical functions: 1. **Function \( g(x) \):** \[ g(x) = \frac{\sqrt{1 + \sin(2x)}}{2x - \tan(x)} \] - This function involves a square root in the numerator, encompassing \( 1 + \sin(2x) \). - The denominator is \( 2x - \tan(x) \). 2. **Function \( h(t) \):** \[ h(t) = \frac{(9 - 3t)^{10}}{t^2 \sin(7t)} \] - The numerator is the expression \( (9 - 3t) \) raised to the power of 10. - The denominator comprises \( t^2 \) multiplied by \( \sin(7t) \). 3. **Function \( y \):** \[ y = \frac{3 + 8x}{(1 + 2x^2)^4} \cdot \frac{\cos(1 - x)}{(5x + x^2)^7} \] - The expression has two fractional parts multiplied together. - The first part has a numerator of \( 3 + 8x \), and the denominator is \( (1 + 2x^2)^4 \). - The second part has a numerator of \( \cos(1 - x) \) and a denominator of \( (5x + x^2)^7 \). These equations can be used to illustrate various concepts in calculus, such as differentiation and integration of complex functions.