Let x and y be rational and irrational numbers respectively. Is x + y necessarily an irrational number? Give an example in support of your number? About the author Isabella
Answer: Let x and y be rational and irrational numbers , respectively. Is x+y necessarily an irrational number Answer Step by step solution by experts to help you in doubt clearance & scoring excellent marks in exams. check-circle Text Solution Open Answer in App Solution Yes ,(x+y) is necessarily an irrational number . <br> e.g… Let <br> Then, <br> if possible, let x+y =2 be a rational number. <br> Consider , <br> On Squaring both sides, we get <br> <br> <br> <br> So, a is rational is rational is rational. <br> But, this contradicits the fact that is an irrational number. thus, our assumption is wrong. <br> Hence, x+ y is an irraional number. Reply
Answer:
Let x and y be rational and irrational numbers , respectively. Is x+y necessarily an irrational number
Answer
Step by step solution by experts to help you in doubt clearance & scoring excellent marks in exams.
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Text Solution
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Solution
Yes ,(x+y) is necessarily an irrational number . <br> e.g… Let
<br> Then,
<br> if possible, let x+y =2
be a rational number. <br> Consider ,
<br> On Squaring both sides, we get <br>
<br>
<br>
<br> So, a is rational
is rational
is rational. <br> But, this contradicits the fact that
is an irrational number. thus, our assumption is wrong. <br> Hence, x+ y is an irraional number.