Show that the equation $x^3 + x^2 - 5 = 0$ has a solution between $x = 1$ and $x = 2$ - OCR - GCSE Maths - Question 18 - 2023 - Paper 4

We will use a numerical method, such as the bisection method, to find a more precise value of the root.

1. Evaluate the midpoint, $x = 1.5$: $f(1.5) = (1.5)^3 + (1.5)^2 - 5 = 3.375 + 2.25 - 5 = 0.625$

Since $f(1.5) > 0$, the root must be in the interval $(1, 1.5)$.

2. Next, evaluate the midpoint again at $x = 1.25$: $f(1.25) = (1.25)^3 + (1.25)^2 - 5 = 1.953125 + 1.5625 - 5 = -1.484375$

Since $f(1.25) < 0$, the root is in the interval $(1.25, 1.5)$.

3. Evaluate at $x = 1.4$: $f(1.4) = (1.4)^3 + (1.4)^2 - 5 = 2.744 + 1.96 - 5 = -0.296$

Since $f(1.4) < 0$, the root is in the interval $(1.4, 1.5)$.

4. Evaluate at $x = 1.45$: $f(1.45) = (1.45)^3 + (1.45)^2 - 5 = 3.052625 + 2.1025 - 5 = 0.155125$

Since $f(1.45) > 0$, the root is in the interval $(1.4, 1.45)$.

5. Evaluating at $x = 1.42$: $f(1.42) = (1.42)^3 + (1.42)^2 - 5 = 2.857208 + 2.0164 - 5 = -0.126392$

6. Continue until we reach our required accuracy, determining the final value lies between $1.4$ and $1.5$, correct to 1 decimal place:

Thus, the solution is approximately $1.4$.