Given that $f(x) = 2e^{x} - 5, \; x \in \mathbb{R}$ (a) sketch, on separate diagrams, the curve with equation (i) $y = f(x)$ (ii) $y = |f(x)|$ On each diagram, show the coordinates of each point at which the curve meets or cuts the axes - Edexcel - A-Level Maths Pure - Question 3 - 2015 - Paper 3

To solve $|f(x)| = 2$:

1. Considering $f(x) = 2$: $2e^{x} - 5 = 2 \implies 2e^{x} = 7 \implies e^{x} = \frac{7}{2} \implies x = \ln(\frac{7}{2}).$

2. Considering $f(x) = -2$: $2e^{x} - 5 = -2 \implies 2e^{x} = 3 \implies e^{x} = \frac{3}{2} \implies x = \ln(\frac{3}{2}).$

Therefore, the exact solutions are: $x = \ln(\frac{7}{2}), \ldots, \ln(\frac{3}{2}).$