Given that $y = 2^x$,\n\n(a) express $4^x$ in terms of $y$.\n\n(b) Hence, or otherwise, solve\n$$8(4^x) - 9(2^{2x}) + 1 = 0$$ - Edexcel - A-Level Maths Pure - Question 8 - 2015 - Paper 1
Question 8
Given that $y = 2^x$,\n\n(a) express $4^x$ in terms of $y$.\n\n(b) Hence, or otherwise, solve\n$$8(4^x) - 9(2^{2x}) + 1 = 0$$
Worked Solution & Example Answer:Given that $y = 2^x$,\n\n(a) express $4^x$ in terms of $y$.\n\n(b) Hence, or otherwise, solve\n$$8(4^x) - 9(2^{2x}) + 1 = 0$$ - Edexcel - A-Level Maths Pure - Question 8 - 2015 - Paper 1
Step 1
express $4^x$ in terms of $y$
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Answer
To express 4x in terms of y, we can start with the relationship between 4 and 2.\n\nSince 4=22, we have:\n\n4x=(22)x=22x\n\nGiven that y=2x, we can express 22x as follows:\n\n22x=(2x)2=y2\n\nThus, we conclude that:\n\n4x=y2
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Answer
Substituting our expression for 4x into the equation, we get:\n\n8(y2)−9(22x)+1=0\n\nNext, we realize that 22x=(2x)2=y2. Thus, we can substitute this as well:\n\n8y2−9y2+1=0\n\nSimplifying the equation gives us:\n\n−y2+1=0\n\nRearranging yields:\n\ny2=1\n\nTaking the square root of both sides results in:\n\ny=pm1\n\nSince y=2x, setting y=1 gives us:\n\n2x=1Rightarrowx=0\n\nSetting y=−1 is not possible as 2x cannot be negative. Therefore, the only solution is:\n\nx=0
