If 2^{3y+x}=16 and 2^{2y−x}=64
If $ 2^{3y+x}=16 \: and\: 2^{2y−x}=64$, then what is the value of y
यदि $ 2^{3y + x} = 16 और 2^{2y – x} = 64$ है, तो y का मान कितना हैं?
Detailed Solution & Logic
Correct Answer:
2
$2^{3y} + x = 16$ and $2^{2y} - x = 64$
We need to find the value of $y$.
Step 1: Express $x$ from both equations
From the first equation: $x = 16 - 2^{3y}$
From the second equation: $x = 2^{2y} - 64$
Step 2: Equate the two expressions for $x$
$16 - 2^{3y} = 2^{2y} - 64$
$2^{3y} + 2^{2y} = 16 + 64 = 80$
Step 3: Factorize
$2^{2y} (2^y + 1) = 80$
Let $2^y = t$, then $2^{2y} = t^2$, so
$t^2 (t + 1) = 80$
$t^3 + t^2 - 80 = 0$
Step 4: Solve cubic equation
Try integer factors of 80. If $t = 4$:
$4^3 + 4^2 - 80 = 64 + 16 - 80 = 0 ✅$
So, $2^y = 4$
Step 5: Solve for $y$
$2^y = 4 = 2^2$
$y = 2$
✅ Answer: $y = 2$
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