A curve C has equation $y = e^x + x^4 + 8x + 5$ - Edexcel - A-Level Maths Pure - Question 2 - 2014 - Paper 6

i) $y = x^3$:

• The curve is a cubic and passes through the origin (0,0). It is increasing throughout with its inflection point at the origin.

ii) $y = 2 - e^{-x}$:

• This is an exponential decay function that approaches 2 as $x$ increases, and cuts the y-axis at (0, 1).
• The asymptote is the line $y = 2$.

On the diagram, the intersection points where each curve crosses the y-axis should be annotated, along with the asymptote.

The graph of $y = x^2$ intersects with $y = 2 - e^{-x}$ at only one point. This indicates that the equation $x^2 = 2 - e^{-x}$ has a unique solution. The curvature of the parabola $y = x^2$ and the asymptotic behavior of $y = 2 - e^{-x}$ illustrate that the two functions only meet once.

Using the iteration formula: x_{n+1} = (-2 - e^{-x_n})^{rac{1}{3}},\, x_0 = -1 Perform the following calculations:

1. For $x_1$: = -1.26376 ext{ (to 5 decimal places)}$$
2. For $x_2$: = -1.26126 ext{ (to 5 decimal places)}$$

The x-coordinate of the turning point is approximately $-1.26$. To find the corresponding y-coordinate, substitute $x = -1.26$ back into the original equation: