Question

prove that 2√3 + √5 is an irrational number​

Answer 1

Answer:

this is non termination and non repeating

so it is irrational

Step-by-step explanation:

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Answer 2

Answer:

a) Let us assume that 2

3

+

5

is rational number.

Let P=2

3

+

5

is rational

on squaring both sides we get

P

2

=(2

3

+

5

)

2

=(2

3

)

2

+(

5

)

2

+2×2

3

×

5

P

2

=12+5+4

15

P

2

=17+4

15

4

P

2

−17

=

15

………..(1)

Since P is rational no. therefore P

2

is also rational &

4

P

2

−17

is also rational.

But

15

is irrational & in equation(1)

4

P

2

−17

=

15

Rational



= irrational

Hence our assumption is incorrect & 2

3

+

5

is irrational number.

b) P=(2

3

+

5

)(2

3

−

5

)

P=12−5=7

Hence P is rational as

q

p

=

1

7

& both p & q are coprime numbers

Step-by-step explanation:

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