Given that $9^{- rac{1}{2}} = 27^{x} + 3^{1+x}$
find the exact value of x. - Edexcel - GCSE Maths - Question 20 - 2019 - Paper 1
Question 20
Given that $9^{- rac{1}{2}} = 27^{x} + 3^{1+x}$
find the exact value of x.
Worked Solution & Example Answer:Given that $9^{- rac{1}{2}} = 27^{x} + 3^{1+x}$
find the exact value of x. - Edexcel - GCSE Maths - Question 20 - 2019 - Paper 1
Step 1
Convert to a Common Base
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Answer
First, we can express the bases as powers of 3:
9 can be written as 32, so: 9^{- rac{1}{2}} = (3^2)^{- rac{1}{2}} = 3^{-1}
27 can be written as 33, so: 27x=(33)x=33x
Now, substituting these into the equation gives us: 3−1=33x+31+x
Step 2
Combine the Terms
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Answer
Next, since the bases are the same, we can combine and equate the exponents:
3−1=33x+31+x
This leads us to isolate the terms: - rac{1}{2} = 3x + 1 + x
Where 1+x comes from the addition of the powers.
Step 3
Solve for x
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