Show that √2 is irrational, and hence prove that 11 - 15√2 is irra

1.	Show that √2 is irrational, and hence prove that 11 - 15√2 is irrational
Answer» Answer: let us assume that √2 is a rational number. so it can be expressed in the form of p/q, where p and q is CO prime integers and q equal to not zero. =√2=p/q on square both side we get , =2= p square/ q square 5p square= p square---------(1) so 2 divides p p is a multiple of 2 p=2m p square=4m square--------(2) from equation 1 and 2 we get, 2q square = 4m square. q square =2m square. q square is a multiple of 2 q is a multiple of 2 hence p and q have a common factor 2. This contradiction our ASSUMPTIONS that they are co Prime's . THEREFORE p/q is not a rational number √2 is an irrational number.

Show that √2 is irrational, and hence prove that 11 - 15√2 is irrational

Answer»

Answer:

let us assume that √2 is a rational number.

so it can be expressed in the form of p/q, where p and q is CO prime integers and q equal to not zero.

=√2=p/q

on square both side we get ,

=2= p square/ q square

5p square= p square---------(1)

so 2 divides p

p is a multiple of 2

p=2m

p square=4m square--------(2)

from equation 1 and 2 we get,

2q square = 4m square.

q square =2m square.

q square is a multiple of 2

q is a multiple of 2

hence p and q have a common factor 2. This contradiction our ASSUMPTIONS that they are co Prime's . THEREFORE p/q is not a rational number

√2 is an irrational number.

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