# What is the solution set for the inequation lx+1/x l>2?

Q. What is the solution set for the inequation |x+1/x |>2?

First of all from the question you’ve written it is not clear if |x+1/x | means Anyway we’ll discuss both of them.

1. Note that inside the modulus we are simply adding a number to its inverse. Sum of any positive number and its multiplicative inverse is always greater than 2 unless that number is 2. This can be proved by AM GM. Also if the inequality is true for any positive k then it is also true for –k as well.
Hence solution set will be R – {–1. 1}.

2.  Let . So the inequality becomes For t > –1: For t < –1: –1 – t > 2

Hence,  • 0

First of all from the question you’ve written it is not clear if |x+1/x | means Anyway we’ll discuss both of them.

1. Note that inside the modulus we are simply adding a number to its inverse.
Sum of any positive number and its multiplicative inverse is always greater than 2 unless that number is 2.
This can be proved by AM GM.
Also if the inequality is true for any positive k then it is also true for –k as well.
Hence solution set will be R – {–1, 1} or all real numbers except 1 and -1.

2.  Let . So the inequality becomes For t > –1: For t < –1: –1 – t > 2

Hence,  • 1
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