Show that the function f(x) = e^(x) is s...

Show that the function `f(x) = e^(x)` is strictly increasing on R.

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To show that the function \( f(x) = e^x \) is strictly increasing on \( \mathbb{R} \), we will use the concept of derivatives. Here are the steps to prove this: ### Step 1: Find the derivative of the function We start with the function: \[ f(x) = e^x \] Now, we differentiate \( f(x) \) with respect to \( x \): ...

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RS AGGARWAL-APPLICATIONS OF DERIVATIVES-Objective Questions

Show that the function f(x) = e^(x) is strictly increasing on R.
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If y = 2^(x) " then " (dy)/(dx) =?
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If y = log(10) x " then "(dy)/(dx)= ?
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If y = e^(1//x) " then " (dy)/(dx) = ?
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if y=x^x then (dy)/(dx)
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If y = x^(sin x) " then " (dy)/(dx) = ?
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If y = x^(sqrtx) " then " (dy)/(dx) = ?
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If y = e^(sin sqrtx) " then " (dy)/(dx) = ?
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If y = (tan x)^(cot x) " then " (dy)/(dx)= ?
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If y = (sin x)^(log x) " then " (dy)/(dx) =?
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If y = sin (x^(x)) " then " (dy)/(dx) = ?
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If y = sqrt(x sin x) " then "(dy)/(dx) = ?
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If e^(x +y) = xy " then " (dy)/(dx)= ?
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If (x +y) = sin (x + y) " then " (dy)?(dx)= ?
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If sqrtx + sqrty = sqrta " then " (dy)/(dx) = ?
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If x^(y) = y^(x) " then " (dy)/(dx)= ?
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If x^(p) y^(q) = (x + y)^((p + q)) " then " (dy)/(dx)= ?
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If y = x^(2) " sin " (1)/(x) " then " (dy)/(dx) = ?
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If y = cos^(2) x^(3) " then "(dy)/(dx) = ?
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If y = log (x + sqrt(x^(2) + a^(2))) " then " (dy)/(dx) = ?
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If y = "log "((1 + sqrtx)/(1 - sqrtx)) " then " (dy)/(dx) = ?
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