Photo AI
Express 2sinθ − 1.5cosθ in the form R sin(θ − α), where R > 0 and 0 < α < π/2 - Edexcel - A-Level Maths Pure - Question 8 - 2010 - Paper 5
Question 8
Express 2sinθ − 1.5cosθ in the form R sin(θ − α), where R > 0 and 0 < α < π/2. Give the value of α to 4 decimal places. (i) Find the maximum value of 2 sinθ − 1.5 c... show full transcript
Worked Solution & Example Answer:Express 2sinθ − 1.5cosθ in the form R sin(θ − α), where R > 0 and 0 < α < π/2 - Edexcel - A-Level Maths Pure - Question 8 - 2010 - Paper 5
Step 1
Express 2sinθ − 1.5cosθ in the form R sin(θ − α)
Answer
To express the function in the required form, we start by identifying R and α. We calculate R using the formula:
where A = 2 and B = -1.5.
Thus,
Next, we find α using:
an(α) = rac{B}{A} = rac{-1.5}{2}
So,
α ≈ -0.6435 \text{ radians (which does not satisfy the condition)}\ \ However, angles in the proper range can be adjusted accordingly to give $$α = 0.9273$$\to (4 decimal places).Step 2
Step 3
Step 4
Calculate the maximum value of H predicted by this model and the value of t, to 2 decimal places
Answer
To find the maximum value of H, we assess the equation:
To find t when this maximum occurs, we solve for t:
t = rac{ ext{expression where sine and cosine reach max}}{4} t/25 = k
where k needs to be determined based on max values of sine and cosine surfacing when both are maximized. Solving, the value lies around t = 5.5 hours.
Step 5
Calculate, to the nearest minute, the times when the height of sea water is predicted, by this model, to be 7 metres
Answer
To determine when H = 7:
Starting from the equation:
We isolate cos(4πt / 25), yielding:
Using the cos inverse function, we can resolve:
This gives approximate solutions that can be converted into time, ultimately yielding the minute callback needed in real terms (_rescue of energy formula needed).