Given that
$$9^{ rac{1}{2}} = 27^{x} + 3^{x}$$
find the exact value of x. - Edexcel - GCSE Maths - Question 19 - 2019 - Paper 1
Question 19
Given that
$$9^{ rac{1}{2}} = 27^{x} + 3^{x}$$
find the exact value of x.
Worked Solution & Example Answer:Given that
$$9^{ rac{1}{2}} = 27^{x} + 3^{x}$$
find the exact value of x. - Edexcel - GCSE Maths - Question 19 - 2019 - Paper 1
Step 1
Step 1: Convert to a common base
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Answer
We can start by expressing all terms on the left-hand side in terms of powers of 3. Since
9=32,
we have:
9^{ rac{1}{2}} = (3^2)^{ rac{1}{2}} = 3^{1} = 3.
Thus, the equation simplifies to:
3=27x+3x.
Step 2
Step 2: Simplify the terms
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Answer
Next, we express 27 as a power of 3:
27=33,
therefore:
27x=(33)x=33x.
Substituting this back into the equation gives:
3=33x+3x.
Step 3
Step 3: Solve for x
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Answer
Now we can rewrite the equation:
3=33x+3x
We can express 3 as
31, leading to:
31=33x+3x.
This implies:
31=3x(32x+1)
Setting the bases equal gives:
1=32x+1,
which simplifies to:
32x=2.
Taking logarithm on both sides:
