Step by step please differentiate for dy/dx

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The text in the image reads as follows: \[ y = 10^{\tan x} \] This is an exponential function where the base is 10 and the exponent is the tangent of x. For further understanding: - The tangent function, denoted as \(\tan x\), is a trigonometric function that relates the angle \( x \) (in radians) to the ratio of the opposite side over the adjacent side in a right-angled triangle. - The resulting value from \( \tan x \) serves as the exponent for the base 10 in this equation. This type of function can exhibit rapid growth or decay depending on the value of \( x \), due to the nature of the tangent function, which has a periodicity and vertical asymptotes where the function approaches infinity.

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### Example of an Elementary Function This function represents an interesting relationship between \( x \) and \( y \) and is given as follows: \[ y = x^{\sin^{-1} x} \] In this equation: - \( y \) denotes the dependent variable. - \( x \) denotes the independent variable. - \( \sin^{-1} x \) represents the inverse sine function, also known as the arcsine function, which is the angle whose sine is \( x \). #### Explanation - \( x^{\sin^{-1} x} \): This mathematical expression means that \( x \) is raised to the power of the arcsine of \( x \). This function combines polynomial and trigonometric aspects, providing an intriguing example for students to explore systems where these two types of mathematical operations interact. When graphing this function, it should be noted that: - The domain of \( x \) must be within \([-1, 1]\) because the arcsine function, \( \sin^{-1} x \), is only defined within this interval. - The graph may exhibit interesting behavior around the endpoints of the domain due to the nature of the arcsine function approaching \(-\frac{\pi}{2}\) and \(\frac{\pi}{2}\).