OABC is a trapezium - Edexcel - GCSE Maths - Question 19 - 2021 - Paper 3
Question 19
OABC is a trapezium.
\( \vec{OA} = \vec{a} \)
\( \vec{AB} = \vec{b} \)
\( \vec{OC} = 3\vec{b} \)
D is the point on OB such that \( OD:DB = 2:3 \)
E is the point on... show full transcript
Worked Solution & Example Answer:OABC is a trapezium - Edexcel - GCSE Maths - Question 19 - 2021 - Paper 3
Step 1
Work out the relationship involving D in terms of a and b
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Answer
Given the ratio ( OD:DB = 2:3 ) implies that point D divides line OB in that ratio. We can express the position of D as:
OD=52OB=52(a+b)
Step 2
Work out the relationship involving E in terms of a and b
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Answer
The point E divides line BC in the ratio ( BE:EC = 1:4 ). Therefore, we can express ( \vec{E} ) in terms of the vector from B to C:
E=51BC+B=51(OC−OB)+(a+b)=51(3b−(a+b))+(a+b)
Step 3
Calculate \( \vec{DE} \)
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Answer
The vector ( \vec{DE} ) can be calculated as:
DE=E−D
Substituting our previously found expressions for ( \vec{D} ) and ( \vec{E} ) gives us:
ight) - \left( \frac{2}{5} (\vec{a} + \vec{b}) \right) $$
This can be simplified to get \( \vec{DE} \) in its simplest form.
