How do i find the x intercept of y=\log_e(3x−2)+2? The x intercept is when y = 0. That means \ln(3x-2) = -2. I.e. 3x-2 = e^{-2} which means that x = \frac13(2+e^{-2}).

If the pdf of X is given by: f_X(x) = e^{-x}\cdot\mathbb{1}_{x>0} then Y=\log(X) is supported on \mathbb{R} and: \mathbb{P}[Y<c]=\mathbb{P}[X<e^c]=1-e^{-e^c} so: f_Y(x) = \exp(x-e^x) ...

HINT Note that F_Y(y) = \mathbb{P}[Y \le y] = \mathbb{P}[-\ln X \le y] = \mathbb{P}[X \ge e^{-y}] = 1 - F_X(e^y). Hence f_Y(y) = F'_Y(y) = -f_X(e^y) e^y. Can you substitute f_X(y) and ...

With GLMs, it's generally best not to think of them as "conditional mean + error" -like models but as "conditional distribution" models. In the case of the Gamma model, note that the variance is ...

You can calculate the elasticity using the formula elasticity=\frac{dy}{dx} \frac{x}{y} In your case (assuming e is the error so we can ignore it) y = e^{a+bx}=e^ae^{bx} (after applying the ...

The limit of the logarithm is \lim_{x\to0^+}x\ln\ln(1+x) With 1+x=e^t, it becomes \lim_{t\to0^+}(e^t-1)\ln t= \lim_{t\to0^+}\frac{e^t-1}{t}(t\ln t) The first factor has limit 1, the ...