The length of side of cube is [tex]3n^9[/tex] units
Solution:
Given that, volume of cube is [tex]27n^{27}[/tex] cubic units
To find: length of one side of cube
The volume of a cube is given as:
[tex]v = a^3[/tex]
Where, "a" is the length of side of cube
Substituting the given value of volume we get,
[tex]27n^{27} = a^3[/tex] ------ eqn 1
We know that,
[tex]27 = 3 \times 3 \times 3 = 3^3[/tex]
Substitute the above in eqn 1
[tex]3^3 n^{27} = a^3[/tex]
Now again substitute for 27 = 3 x 9
[tex]3^3n^{3.9} = a^3[/tex]
Take 3 as common power
[tex](3n^9)^3 = a^3[/tex]
By taking cube roots on both side,
[tex]3n^9 = a\\\\a = 3n^9[/tex]
Thus length of side of cube is [tex]3n^9[/tex] units
Answer:
the answer is 3n^9
Step-by-step explanation:
I just took the test ;)
