Math, asked by Manisha13Ranwa, 1 year ago

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Please solve it for me
if you know only 1 than please answer one of them⚡♠️⚡​

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Answered by ArunaSh
2

8th and 9 th both are irrational


Manisha13Ranwa: ya i Know that but tell me how please write full solution
ArunaSh: let, √3-5 is rational number √3-5=p/q √3=p/q-3 √3=p-3q/q we know that p/q is a rational number √3 is also irrational number , so our contraduction is wrong, √3-5 is irrational
ArunaSh: this is answer of 8th question
ArunaSh: ans 9 th _________ , we have to prove that √3 is irrational _______ , let us assume the opposite, √3 is rational, √3 can be writen in the form p/q , where and q are co - prime factor ( no common factor other than 1) and q is not equal to 0 ,___________ hence √3 =p/q ,0____________________ squring of both sides _______________ (√3)= (p/q)^2 , √3\q =p 1st equation _____&________________ squaring of both sides (√3)^2 =p/q^2 2nd equation ________ so √3 i_
ArunaSh: if it helps plese mark it as brainliest
Manisha13Ranwa: thank you soooooooooo muchhhhhh
Manisha13Ranwa: ☺️☺️☺️☺️☺️☺️☺️☺️
ArunaSh: its my pleasure
ArunaSh: that there is someone who say thanks to me
Answered by Anonymous
1

9) Let us assume that √3 is a rational number. That is, we can find integers a and b (≠ 0) such that √3 = (a/b) Suppose a and b have a common factor other than 1, then we can divide by the common factor, and assume that a and b are coprime. √3b = a ⇒ 3b2=a2 (Squaring on both sides) → (1) Therefore, a2 is divisible by 3 Hence ‘a’ is also divisible by 3. So, we can write a = 3c for some integer c. Equation (1) becomes, 3b2 =(3c)2 ⇒ 3b2 = 9c2 ∴ b2 = 3c2 This means that b2 is divisible by 3, and so b is also divisible by 3. Therefore, a and b have at least 3 as a common factor. But this contradicts the fact that a and b are coprime. This contradiction has arisen because of our incorrect assumption that √3 is rational. So, we conclude that √3 is irrational.

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