Math, asked by khushi023023, 1 year ago

prove that if a number is tripled then it is 27 times the cube of the given number​

Answers

Answered by siddhartha6716
4

Step-by-step explanation:

Solution :-

Let us assume that the original number = 'x'

Its cube = (x)³

= x³

If the original number is tripled then the new number = 3*x

= 3x

Cube of the new number = (3x)³

 

= 3x*3x*3x

= 27x³

Therefore,

Cube of the original number : Cube of the new number which is tripled

⇒  1 : 27

Hence, the cube of the new number is 27 times the cube of the original number.

Hence proved

Answer.

HOPE THIS HELPS

Answered by varadad25
1

Answer:

Let the given number be x.

The cube of the given number = ( x )³ = x³

Now, the tripled number = 3 × x = 3x

Now, from given condition,

∴ ( 3x )³ = 27x³

Now, from second condition,

( 3x )³ = 27x³

Hence Proved!

Now, we will see if our proof is right or not.

Let assume that x = 2.

∴ From the first condition,

( 3 × 2 )³ = ( 6 )³ = 216 ...... ( 1 )

And now, from second condition,

27 × ( 2 )³ = 27 × 8 = 216 ........... ( 2 )

From equations ( 1 ) & ( 2 ), we can say that our proof is correct.

Hence,

If a number is tripled then its cube is 27 times the cube of the given number.

★ Some Interesting Facts ★

If we multiplied a number by another number and then we powered it ( index ) to that another number, we will get that power to the multiplied the given number.

Let's see here :

If we doubled a number then its square is 4 times the square of the given number.

Let the number be 3.

∴ From first condition,

∴ (2 × 3)² = ( 6 )² = 36 ...... ( 1 )

From second condition,

∴ 4 × ( 3 )² = 4 × 9 = 36 ....... ( 2 )

So, from ( 1 ) & ( 2 ), we can conclude the above fact.

Similar questions