Solve 4^(2x) = (cube root 16)^(-6/y) = (√8)^2 Solve: \(4^{2x} = (\sqrt[3]{16})^{-6/y} = (\sqrt{8})^2\) Solution \[ (\sqrt{8})^2 = (8^{1/2})^2 = 8 \] \[ \Rightarrow 4^{2x} = 8 \] \[ \Rightarrow (2^2)^{2x} = 2^3 \] \[ \Rightarrow 2^{4x} = 2^3 \] \[ \Rightarrow 4x = 3 \] \[ \Rightarrow x = \frac{3}{4} \] \[ (\sqrt[3]{16})^{-6/y} = […]
Solve the following equation : 4^2x = (3√16)^{-6/y} = (√8)^2 Read More »
Solve 3^(x+1) = 27 × 3^4 Solve: \(3^{x+1} = 27 \times 3^4\) Solution \[ 3^{x+1} = 27 \times 3^4 \] \[ \Rightarrow 3^{x+1} = 3^3 \times 3^4 \] \[ \Rightarrow 3^{x+1} = 3^{7} \] \[ \Rightarrow x + 1 = 7 \] \[ \Rightarrow x = 6 \] Final Answer: \[ \boxed{x = 6} \]
Solve the following equation : 3^x+1 = 27 × 3^4 Read More »
Find x and y Find \(x\) and \(y\), if \(5^{3x} = 125\) and \(10^y = 0.001\) Solution \[ 5^{3x} = 125 \] \[ \Rightarrow 5^{3x} = 5^3 \] \[ \Rightarrow 3x = 3 \] \[ \Rightarrow x = 1 \] \[ 10^y = 0.001 \] \[ \Rightarrow 10^y = 10^{-3} \] \[ \Rightarrow y =
If 5^3x = 125 and 10^y = 0.001 find x and y Read More »
Find 2^(1+x) Find: \(2^{1+x}\), if \(3^{4x} = 81^{-1}\) and \(10^{1/y} = 0.0001\) Solution \[ 3^{4x} = 81^{-1} \] \[ \Rightarrow 3^{4x} = (3^4)^{-1} \] \[ \Rightarrow 3^{4x} = 3^{-4} \] \[ \Rightarrow 4x = -4 \] \[ \Rightarrow x = -1 \] \[ 10^{1/y} = 0.0001 \] \[ \Rightarrow 10^{1/y} = 10^{-4} \] \[ \Rightarrow
If 3^4x = (81)^-1 and 10^1/y = 0.0001, find the value of 2^1+x Read More »
Find 2^(1+x) Find: \(2^{1+x}\), if \(3^{x+1} = 9^{x-2}\) Solution \[ 3^{x+1} = 9^{x-2} \] \[ \Rightarrow 3^{x+1} = (3^2)^{x-2} \] \[ \Rightarrow 3^{x+1} = 3^{2x-4} \] \[ \Rightarrow x+1 = 2x-4 \] \[ \Rightarrow x = 5 \] \[ 2^{1+x} = 2^{6} \] \[ = 64 \] Final Answer: \[ \boxed{64} \] Next Question /
If 3^x+1= 9^x-2, find the value of 2^1+x Read More »
Find (8x)^x Determine: \((8x)^x\), if \(9^{x+2} = 240 + 9^x\) Solution \[ 9^{x+2} = 240 + 9^x \] \[ \Rightarrow 9^x \cdot 9^2 = 240 + 9^x \] \[ \Rightarrow 81 \cdot 9^x = 240 + 9^x \] \[ \Rightarrow 81 \cdot 9^x – 9^x = 240 \] \[ \Rightarrow 80 \cdot 9^x = 240
Determine (8x)^x, if 9^{x+2} = 240 + 9^x Read More »
Prove x^3 – 6x = 6 Given \(x = 2^{1/3} + 2^{2/3}\), show that \(x^3 – 6x = 6\) Solution \[ x = 2^{1/3} + 2^{2/3} \] \[ x^3 = (2^{1/3} + 2^{2/3})^3 \] \[ = (2^{1/3})^3 + (2^{2/3})^3 + 3 \cdot 2^{1/3} \cdot 2^{2/3}(2^{1/3} + 2^{2/3}) \] \[ = 2 + 4 + 3
If x = 2^1/3 + 2^2/3, show that x^3 – 6x = 6 Read More »
Solve (√(3/5))^(x+1) = 125/27 Solve: \(\left(\sqrt{\frac{3}{5}}\right)^{x+1} = \frac{125}{27}\) Solution \[ \left(\sqrt{\frac{3}{5}}\right)^{x+1} = \frac{125}{27} \] \[ \Rightarrow \left(\frac{3}{5}\right)^{\frac{x+1}{2}} = \frac{5^3}{3^3} \] \[ \Rightarrow \frac{3^{\frac{x+1}{2}}}{5^{\frac{x+1}{2}}} = \frac{5^3}{3^3} \] \[ \Rightarrow 3^{\frac{x+1}{2}} \cdot 3^3 = 5^{\frac{x+1}{2}} \cdot 5^3 \] \[ \Rightarrow 3^{\frac{x+1}{2} + 3} = 5^{\frac{x+1}{2} + 3} \] \[ \Rightarrow \frac{x+1}{2} + 3 = 0 \] \[
Find the values of x in the following : (√(3/5))^{x+1} = 125/27 Read More »
Solve 13^(√x) = 4^4 – 3^4 – 6 Solve: \(13^{\sqrt{x}} = 4^4 – 3^4 – 6\) Solution \[ 13^{\sqrt{x}} = 4^4 – 3^4 – 6 \] \[ \Rightarrow 13^{\sqrt{x}} = 256 – 81 – 6 \] \[ \Rightarrow 13^{\sqrt{x}} = 169 \] \[ \Rightarrow 13^{\sqrt{x}} = 13^2 \] \[ \Rightarrow \sqrt{x} = 2 \] \[
Find the values of x in the following : (13)^√x = 4^4 – 3^4 – 6 Read More »
Solve 5^(2x+3) = 1 Solve: \(5^{2x+3} = 1\) Solution \[ 5^{2x+3} = 1 \] \[ \Rightarrow 1 = 5^0 \] \[ \Rightarrow 5^{2x+3} = 5^0 \] \[ \Rightarrow 2x + 3 = 0 \] \[ \Rightarrow 2x = -3 \] \[ \Rightarrow x = -\frac{3}{2} \] Final Answer: \[ \boxed{x = -\frac{3}{2}} \] Next Question
Find the values of x in the following : 5^{2x+3} = 1 Read More »