If we increase the side of a cube by 6, how many times will the volume of the cube increase?
If we increase the side of a cube by 6, how many times will the volume of the cube increase?
Given a square whose sides are 5. We draw another square whose sides are longer by 5 than the length of the sides of the previous square. Find the area of the new square.
A square has sides measuring 6 cm long. Another square has sides measuring 3 cm less than those of the previous square. Calculate the area of the new square.
Given a square whose side length is 4. We draw a new square so that its side is greater by 2 than the sides of the given square. Find the area of the new square.
Given a square whose side length is 9. We draw a new square so that its side is less by 3 than the sides of the given square. Find the area of the new square.
If we increase the side of a cube by 6, how many times will the volume of the cube increase?
Let's denote the initial cube's edge length as x,
The formula for the volume of a cube with edge length b is:
therefore the volume of the initial cube (meaning before increasing its edge) is:
Now we'll increase the cube's edge by a factor of 6, meaning the edge length is now: 6x, therefore the volume of the new cube is:
where in the second step we simplified the expression for the new cube's volume using the power rule for multiplication in parentheses:
and we applied the power to each term in the parentheses multiplication,
Next we'll answer the question that was asked - "By what factor did the cube's volume increase", meaning - by what factor do we multiply the old cube's volume (before increasing its edge) to get the new cube's volume?
Therefore to answer this question we simply divide the new cube's volume by the old cube's volume:
where in the first step we substituted the expressions for the volumes of the old and new cubes that we got above, and in the second step we reduced the common factor between the numerator and denominator,
Therefore we got that the cube's volume increased by a factor of -when we increased its edge by a factor of 6,
therefore the correct answer is b.
Given a square whose sides are 5. We draw another square whose sides are longer by 5 than the length of the sides of the previous square. Find the area of the new square.
100
A square has sides measuring 6 cm long. Another square has sides measuring 3 cm less than those of the previous square. Calculate the area of the new square.
9
Given a square whose side length is 4. We draw a new square so that its side is greater by 2 than the sides of the given square. Find the area of the new square.
64
Given a square whose side length is 9. We draw a new square so that its side is less by 3 than the sides of the given square. Find the area of the new square.
9