6^1
To write repeated multiplication in an exponential notation, you should write the number that has to be multiplied as the base. Count the number of times that the number is used.
The exponent indicates the number of times the base is used as a factor.
An expression using a base and exponent takes the form ( a^n ), where ( a ) is the base and ( n ) is the exponent. The base represents a number that is multiplied by itself, while the exponent indicates how many times the base is used in the multiplication. For example, in the expression ( 2^3 ), 2 is the base and 3 is the exponent, meaning ( 2 \times 2 \times 2 = 8 ).
If you have ab then a is the base and b the exponent
No, an exponent is not called a base number. the base is the number before the exponent: 34. 3 is the base, 4 is the exponent the expont could also be refered to as three to the fourth power
54
base
To write repeated multiplication in an exponential notation, you should write the number that has to be multiplied as the base. Count the number of times that the number is used.
5^4
You can choose the base to be any number (other than 0, -1 and 1) and calculate the appropriate exponent, or you can choose any exponent and calculate the appropriate base. For example, base 10: 121 = 10^2.08278537 (approx) Or exponent = 10: 121 = 1.615394266^10 (approx). I expect, though, that the answer that is required is 121 = 11^2.
The exponent indicates the number of times the base is used as a factor.
The base of an exponent is the main number. For example in 56 the number 5 is the base and 6 is the exponent.
the answer is 6 cubed
Most likely it is a logarithm.
If you have ab then a is the base and b the exponent
No, an exponent is not called a base number. the base is the number before the exponent: 34. 3 is the base, 4 is the exponent the expont could also be refered to as three to the fourth power
A base number is the value to the power of the exponent. For example, in 2^4, 2 is the base number and 4 is the exponent.