Given that $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, we need to show that $f(x) = 0$ has a root $\alpha$ in the interval $[3.5, 4]$ - Edexcel - A-Level Maths Pure - Question 10 - 2017 - Paper 1
Question 10
Given that $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, we need to show that $f(x) = 0$ has a root $\alpha$ in the interval $[3.5, 4]$.
1. Calculate $f(3.5)$:
$$f(3.5)... show full transcript
Worked Solution & Example Answer:Given that $f(x) = ext{ln}(2x - 5) + 2x^2 - 30$, we need to show that $f(x) = 0$ has a root $\alpha$ in the interval $[3.5, 4]$ - Edexcel - A-Level Maths Pure - Question 10 - 2017 - Paper 1
Step 1
Show that $f(x) = 0$ has a root $\alpha$ in the interval $[3.5, 4]$
96%
114 rated
Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Answer
Given that f(x)=extln(2x−5)+2x2−30, we calculate:
f(3.5)<0
f(4)>0
Using the Intermediate Value Theorem, we conclude that there is at least one root in (3.5,4).
Step 2
apply the Newton-Raphson procedure once to obtain a second approximation for $\alpha$, giving your answer to 3 significant figures.
99%
104 rated
Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Answer
Using x0=4:
x1=4−16.673.099≈3.81
Step 3
Show that $\alpha$ is the only root of $f(x) = 0$
96%
101 rated
Only available for registered users.
Sign up now to view full answer, or log in if you already have an account!
Answer
Since f(x) is continuous and strictly increasing in the interval [3.5,4], and goes from negative to positive, α is the only root.
![Given-that-$f(x)-=--ext{ln}(2x---5)-+-2x^2---30$,-we-need-to-show-that-$f(x)-=-0$-has-a-root-$\alpha$-in-the-interval-$[3.5,-4]$-Edexcel-A-Level Maths Pure-Question 10-2017-Paper 1.png](https://cdn.simplestudy.cloud/assets/backend/uploads/question/MathsPure_Specimen_1_1_QP_8_2017.jpg)
