If 16(a−xa+x)3=(a+xa−x)16\Big(\dfrac{a - x}{a + x}\Big)^{3} = \Big(\dfrac{a + x}{a - x}\Big)16(a+xa−x)3=(a−xa+x), prove that x = a3\dfrac{a}{3}3a.
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Given,
⇒16(a−xa+x)3=(a+xa−x)\Rightarrow 16\Big(\dfrac{a - x}{a + x}\Big)^3 = \Big(\dfrac{a + x}{a - x}\Big)⇒16(a+xa−x)3=(a−xa+x)
Let, r=a+xa−x,1r=a−xa+x.r = \dfrac{a + x}{a - x} , \dfrac{1}{r} = \dfrac{a - x}{a + x}.r=a−xa+x,r1=a+xa−x.
Substituting value of r and 1r\dfrac{1}{r}r1 in 16(a−xa+x)3=(a+xa−x)16\Big(\dfrac{a - x}{a + x}\Big)^3 = \Big(\dfrac{a + x}{a - x}\Big)16(a+xa−x)3=(a−xa+x), we get :
⇒16×(1r)3=r⇒16=r4⇒r4=24⇒r=2.⇒a+xa−x=2⇒a+x=2a−2x⇒3x=a⇒x=a3.\Rightarrow 16 \times \Big(\dfrac{1}{r}\Big)^3 = r \\[1em] \Rightarrow 16 = r^4 \\[1em] \Rightarrow r^4 = 2^4 \\[1em] \Rightarrow r = 2. \\[1em] \Rightarrow \dfrac{a + x}{a - x} = 2 \\[1em] \Rightarrow a + x = 2a - 2x \\[1em] \Rightarrow 3x = a \\[1em] \Rightarrow x = \dfrac{a}{3}.⇒16×(r1)3=r⇒16=r4⇒r4=24⇒r=2.⇒a−xa+x=2⇒a+x=2a−2x⇒3x=a⇒x=3a.
Hence, proved that x = a3\dfrac{a}{3}3a.
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