Math, asked by sankalpmahi122, 8 months ago

Proove that
 \sqrt{3}
is irrational ​

Answers

Answered by Anonymous
4

Answer:

1 \div  \sqrt{3}  = 1 \div  \sqrt{3}  \times  \sqrt{3}  \div  \sqrt{3}  =  \sqrt{3}  \div 3 =  \sqrt{3}  \div   \sqrt{3}  \times  \sqrt{ 3}  = 1 \div  \sqrt{3}

Answered by pulakmath007
1

Answer:

Let us assume that √3 is a rational number.

then, as we know a rational number should be in the form of p/q

where p and q are co- prime number.

So,

√3 = p/q { where p and q are co- prime}

√3q = p

Now, by squaring both the side

we get,

(√3q)² = p²

3q² = p² ........ ( i )

So,

if 3 is the factor of p²

then, 3 is also a factor of p ..... ( ii )

=> Let p = 3m { where m is any integer }

squaring both sides

p² = (3m)²

p² = 9m²

putting the value of p² in equation ( i )

3q² = p²

3q² = 9m²

q² = 3m²

So,

if 3 is factor of q²

then, 3 is also factor of q

Since

3 is factor of p & q both

So, our assumption that p & q are co- prime is wrong

Hence √3 is an irrational number

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