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Question
Prove the following:
`root("ab")(x^"a"/x^"b")·root("bc")(x^"b"/x^"c")·root("ca")(x^"c"/x^"a")` = 1
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Solution
L.H.S.
= `root("ab")(x^"a"/x^"b")·root("bc")(x^"b"/x^"c")·root("ca")(x^"c"/x^"a")`
= `(x^"a"/x^"b")^(1/"ab")·(x^"b"/x^"c")^(1/"bc")·(x^"c"/x^"a")^(1/"ca")`
= `x^(1/"b")/(x1/"a")·x^(1/"c")/(x1/"b")·x^(1/"a")/(x1/"c")` .....(Using (am)n = amn)
= `x^(1/"b"-1/"a")·x^(1/"c"-1/"b")·x^(1/"a"-1/"c")` ....(Using am ÷ an = am-n)
= `x^(("a"-"b")/"ab").x^(("b"-"c")/"bc").x^(("c"-"a")/"ac")`
= `x^(("a-b")/("ab")+("b-c")/("bc")+("c-a")/("ac")` ....(Using am x an = am+n)
= `x^(("ac"-"bc"+"ab"-"ac"+"bc"-"ab")/"abc"`
= `x^(0/"abc")`
= x0
= 1 ......(Using a0 = 1)
=R.H.S.
Hence proved.
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