Show how √5 can be reprented on a number line.
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Firstly make a no line
Then, make a right angle on 2.
Then , cut a arc on it of 1 cm
Then join it with 0
Then using the new root make a right angle and then cut a arc of 1 cm and join it with 0.
Then open the protector from zero th the point where arc cut an pass it on no line
The point it touch no line is root 5
Then, make a right angle on 2.
Then , cut a arc on it of 1 cm
Then join it with 0
Then using the new root make a right angle and then cut a arc of 1 cm and join it with 0.
Then open the protector from zero th the point where arc cut an pass it on no line
The point it touch no line is root 5
Answered by
1
Thanks for question dear !
solution:
√5 = √(4+1) we can take
Here 4 and 1 both no. are perfect square no.
as √4 = 2 and √1 = 1
So draw right triangle with side 2 and 1
And according to Pythagoras theorem
Therefore hypotenuse will √(22+12) = √5
Then draw an arc of √5 on number line
I hopes thats helps
Be Brainly ☺
solution:
√5 = √(4+1) we can take
Here 4 and 1 both no. are perfect square no.
as √4 = 2 and √1 = 1
So draw right triangle with side 2 and 1
And according to Pythagoras theorem
Therefore hypotenuse will √(22+12) = √5
Then draw an arc of √5 on number line
I hopes thats helps
Be Brainly ☺
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