examples of two irrational numbers whose product is a rational number
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hey dear here's ur answer..
【●we know irrational numbers are those numbers which cannot be expressed in the form p/q where p and q are integers and q is not = to 0●】
◆●◆so we know that √2 is an irrational number and product of √2×√2 is rational which is 2..
it's because √2×√2 becomes 【√2】^2 which cancels both root and power.
hope it helps...
@anisha28...☺☺☺
【●we know irrational numbers are those numbers which cannot be expressed in the form p/q where p and q are integers and q is not = to 0●】
◆●◆so we know that √2 is an irrational number and product of √2×√2 is rational which is 2..
it's because √2×√2 becomes 【√2】^2 which cancels both root and power.
hope it helps...
@anisha28...☺☺☺
khushimalviya1:
thanku very much
welcome dearie
if help ful then please mark it as brainliest
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2
Root 3×root 3=3
Root2×root 2=2
Any number in square root, if it is squared the square and the root will be canceled
Root2×root 2=2
Any number in square root, if it is squared the square and the root will be canceled
thanku very much
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