cube/cubed
When you write (10 \times 10 \times 10) as (10^3), the exponent "3" indicates that the base (10) is multiplied by itself three times. The term "third power" refers to raising a number to the exponent of 3. Thus, the third power of 3 is calculated as (3^3 = 3 \times 3 \times 3 = 27).
Neither is greater, because 1 yard is the same as 3 feet. So raising either to the same power will produce the same answer.
The last one is an example of like terms.
5 to the third power is read as "5 cubed" because the term "cubed" refers to raising a number to the power of three, which is analogous to calculating the volume of a cube. In geometry, a cube has three equal dimensions (length, width, height), and thus its volume is determined by multiplying the length of one side by itself three times. Therefore, "cubed" symbolizes this three-dimensional aspect of the exponent.
Multiply them.
Raising a number to the third power is referred to as cubed.
It is loosely called "cubing" the number.
You indicate it with a superscript on the number. For example, a to the third power is a3
You find the length of one side and take it to the third power. Vcube = (length of side)3
When you write (10 \times 10 \times 10) as (10^3), the exponent "3" indicates that the base (10) is multiplied by itself three times. The term "third power" refers to raising a number to the exponent of 3. Thus, the third power of 3 is calculated as (3^3 = 3 \times 3 \times 3 = 27).
A power term.
The common term for raising a base to the second power is to square it.Base^2
(23)4 = 4096 This is because raising a power to a power multiplies the exponents, therefore, (23)4 = 212
Try raising different numbers to the third power. Try -6.35^3
Neither is greater, because 1 yard is the same as 3 feet. So raising either to the same power will produce the same answer.
This is related to the formula to find the volume of a cube (raise the length of the side to the third power).
The term for the action of raising one eyebrow is called "eyebrow raising" or "raising an eyebrow."