The expression (7 \times 7 \times 7) can be written in exponential form as (7^3). This is because the base (7) is multiplied by itself three times.
An exponential or power term.
7x7x7
To convert an exponential expression to an equivalent radical expression, you can use the relationship ( a^{m/n} = \sqrt[n]{a^m} ). For example, the expression ( x^{3/2} ) can be rewritten as ( \sqrt{x^3} ) or ( \sqrt{x^3} = x^{3/2} ). If you provide a specific exponential expression, I can give you its corresponding radical form.
If it is 3 x 3, the answer is 3 squared.
94 = (9 x 101) + (4 x 100)
I think the word you're looking for is "exponential". A linear expression is of the form ax + b whereas an exponential expression is of the form x^a + b.
36.5 is not an exponential expression! Its value is 36.536.5 is not an exponential expression! Its value is 36.536.5 is not an exponential expression! Its value is 36.536.5 is not an exponential expression! Its value is 36.5
525 = 5.25 × 102
An exponential or power term.
To find the exponential form of the expression (2x2x2)x(2x2x2x2x2), we need to simplify the expression first and then express it in exponential form. Given expression: (2x2x2)x(2x2x2x2x2) Simplify the expression: (2x2x2) = 2^3 = 8 (2x2x2x2x2) = 2^5 = 32 Now, substitute the simplified values back into the expression: 8 x 32 = 256 Therefore, the exponential form of (2x2x2)x(2x2x2x2x2) is 256.
7x7x7
no
If it is 3 x 3, the answer is 3 squared.
xx = x2 In exponential form the expression becomes x2y. Technically, it would be correct to write x2y1 but, an exponent of 1 is simply omitted in ordinary mathematics.
210
(2a^2b^2)^3(-7a^13b^2)
Basically, in an exponential expression (or equation) you have the independent variable in the exponent. For example: 5 times 10x The general form of an exponential function can be written as: abx or: aekx where a, b, and k are constants, and e is approximately 2.718. Note that just having a power doesn't mean you have an exponential equation. For example, in x3 the variable does NOT appear in the exponent, so it is not an exponential expression.