Prove that 3+√5 is an irrational

1.	Prove that 3+√5 is an irrational
Answer» Let US assume that 3 + √5 is a rational number. Now, 3 + √5 = (a ÷ B) [Here a and b are co-prime NUMBERS] √5 = [(a ÷ b) - 3] √5 = [(a - 3b) ÷ b] Here, {(a - 3b) ÷ b} is a rational number. But we KNOW that √5 is a irrational number. So, {(a - 3b) ÷ b} is also a irrational number. So, our assumption is wrong. 3 + √5 is a irrational number. Hence, proved. __________________________________ How √5 is a irrational number.? → √5 = a ÷ b [a and b are co-prime numbers] b√5 = a Now, SQUARING on both side we get, 5b² = a² ........(1) b² = a² ÷ 5 Here 5 divide a² and 5 divide a also Now, a = 5c [Here c is any integer] Squaring on both side a² = 25c² 5b² = 25c² [From (1)] b² = 5c² c² = b² ÷ 5 Here 5 divide b² and 5 divide b also → a and b both are co-prime numbers and 5 divide both of them. So, √5 is a irrational number. Hence, proved mark me as BRILLIANT and FOLLOW me

Answer»

Let US assume that 3 + √5 is a rational number.

Now,

3 + √5 = (a ÷ B)

[Here a and b are co-prime NUMBERS]

√5 = [(a ÷ b) - 3]

√5 = [(a - 3b) ÷ b]

Here, {(a - 3b) ÷ b} is a rational number.

But we KNOW that √5 is a irrational number.

So, {(a - 3b) ÷ b} is also a irrational number.

So, our assumption is wrong.

3 + √5 is a irrational number.

Hence, proved.

__________________________________

How √5 is a irrational number.?

→ √5 = a ÷ b [a and b are co-prime numbers]

b√5 = a

Now, SQUARING on both side we get,

5b² = a² ........(1)

b² = a² ÷ 5

Here 5 divide a²

and 5 divide a also

Now,

a = 5c [Here c is any integer]

Squaring on both side

a² = 25c²

5b² = 25c² [From (1)]

b² = 5c²

c² = b² ÷ 5

Here 5 divide b²

and 5 divide b also

→ a and b both are co-prime numbers and 5 divide both of them.

So, √5 is a irrational number.

Hence, proved

mark me as BRILLIANT and FOLLOW me

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