f(x) = 2 \\sin(x^2) + x - 2, \\ 0 \\leq x \\lt 2\pi (a) Show that f(x) = 0 has a root $ \alpha $ between x = 0.75 and x = 0.85. The equation f(x) = 0 can be written as $ x = [\arcsin(1 - 0.5x)]^{\frac{1}{2}} $. (b) Use the iterative formula $ x_{n+1} = [\arcsin(1 - 0.5x_n)]^{\frac{1}{2}} $ to find the values of $ x_1, \\ x_2, \\ and \\ x_3 $, giving your answers to 5 decimal places. (c) Show that $ \alpha = 0.80157 $ is correct to 5 decimal places.

A-Level Edexcel Maths Pure Functions: f(x) = 2 \\sin(x^2) + x

f(x) = 2 \\sin(x^2) + x - 2, \\ 0 \\leq x \\lt 2\pi (a) Show that f(x) = 0 has a root $ \alpha $ between x = 0.75 and x = 0.85 - Edexcel - A-Level Maths Pure - Question 4 - 2011 - Paper 3

Question 4

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f(x) = 2 \\sin(x^2) + x - 2, \\ 0 \\leq x \\lt 2\pi (a) Show that f(x) = 0 has a root $ \alpha $ between x = 0.75 and x = 0.85. The equation f(x) = 0 can be wri... show full transcript

Worked Solution & Example Answer:f(x) = 2 \\sin(x^2) + x - 2, \\ 0 \\leq x \\lt 2\pi (a) Show that f(x) = 0 has a root $ \alpha $ between x = 0.75 and x = 0.85 - Edexcel - A-Level Maths Pure - Question 4 - 2011 - Paper 3

Step 1

Show that f(x) = 0 has a root $ \alpha $ between x = 0.75 and x = 0.85

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Answer

To check for the existence of a root between the intervals, we evaluate the function at the endpoints:

Calculate ( f(0.75) ): [ f(0.75) = 2 \sin(0.75^2) + 0.75 - 2 ] [ f(0.75) \approx -0.18 ]
Calculate ( f(0.85) ): [ f(0.85) = 2 \sin(0.85^2) + 0.85 - 2 ] [ f(0.85) \approx 0.17 ]

Since ( f(0.75) < 0 ) and ( f(0.85) > 0 ), there is a change of sign in the interval ( [0.75, 0.85] ), indicating a root exists by the Intermediate Value Theorem.

Step 2

Use the iterative formula to find the values of $ x_1, \ x_2, \ and \ x_3 $

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Answer

Starting with ( x_0 = 0.8 ):

To find ( x_1 ): [ x_1 = [\arcsin(1 - 0.5 \cdot 0.8)]^{\frac{1}{2}} ] After calculating, ( x_1 \approx 0.80219 ).
To find ( x_2 ): [ x_2 = [\arcsin(1 - 0.5 \cdot 0.80219)]^{\frac{1}{2}} ] After calculating, ( x_2 \approx 0.80133 ).
To find ( x_3 ): [ x_3 = [\arcsin(1 - 0.5 \cdot 0.80133)]^{\frac{1}{2}} ] After calculating, ( x_3 \approx 0.80167 ).

Step 3

Show that $ \alpha = 0.80157 $ is correct to 5 decimal places

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Answer

To verify that ( \alpha = 0.80157 ) is correct to 5 decimal places, we evaluate the function at this point:

Calculate ( f(0.80157) ): [ f(0.80157) = 2 \sin((0.80157)^2) + 0.80157 - 2 \approx -2.7 \times 10^{-5} ]
Perform a similar calculation for ( f(0.801575) ): [ f(0.801575) \approx +8.6 \times 10^{-6} ]

Both calculations show a change of sign, confirming that ( \alpha ) lies between ( 0.80157 ) and ( 0.801575 ), supporting the conclusion that ( \alpha = 0.80157 ) is correct to 5 decimal places.

f(x) = 2 \\sin(x^2) + x - 2, \\ 0 \\leq x \\lt 2\pi (a) Show that f(x) = 0 has a root \( \alpha \) between x = 0.75 and x = 0.85 - Edexcel - A-Level Maths Pure - Question 4 - 2011 - Paper 3

Worked Solution & Example Answer:f(x) = 2 \\sin(x^2) + x - 2, \\ 0 \\leq x \\lt 2\pi (a) Show that f(x) = 0 has a root \( \alpha \) between x = 0.75 and x = 0.85 - Edexcel - A-Level Maths Pure - Question 4 - 2011 - Paper 3

Show that f(x) = 0 has a root \( \alpha \) between x = 0.75 and x = 0.85

Use the iterative formula to find the values of \( x_1, \ x_2, \ and \ x_3 \)

Show that \( \alpha = 0.80157 \) is correct to 5 decimal places

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