36
To write ( bxbxbxbxbxb ) in short index form, you can group the terms. Since there are six ( b )s multiplied together, you can express it as ( b^6 ). Therefore, the short index form of ( bxbxbxbxbxb ) is ( b^6 ).
0.006 in index form can be expressed as (6 \times 10^{-3}). This means that 0.006 is equivalent to 6 multiplied by 10 raised to the power of -3, indicating that the decimal point is moved three places to the left.
7 x 7 x 7 is the expanded form of 343. The proper index form of this exponent would be73
0.0000000063
4d3 multiplications add in powers.
To write ( bxbxbxbxbxb ) in short index form, you can group the terms. Since there are six ( b )s multiplied together, you can express it as ( b^6 ). Therefore, the short index form of ( bxbxbxbxbxb ) is ( b^6 ).
Ah, index form is a way to write numbers using exponents. So, if we want to write 64 in index form, we can express it as 2^6. Isn't that just lovely? It's like a little mathematical painting on canvas!
7 x 7 x 7 is the expanded form of 343. The proper index form of this exponent would be73
"index" is the singular form - "indices" is the plural :)
648 expressed as a product of its prime factors in index form is 2^3 times 3^4
0.0000000063
4d3 multiplications add in powers.
6 X 10 to the power of 1
To express 375 in prime factor index form, first, factor it into its prime components. The prime factorization of 375 is (3 \times 5^3) because (375 = 3 \times 125) and (125 = 5^3). Therefore, the prime factor index form of 375 is (3^1 \times 5^3).
The expression (8 \times 8 \times 8) can be written in index form as (8^3). This indicates that 8 is multiplied by itself three times. The base is 8, and the exponent is 3.
In mathematics, index form refers to expressing a number as a base raised to a power. For example, in the expression 5^3, 5 is the base and 3 is the index or exponent. This notation indicates that 5 is multiplied by itself 3 times, resulting in the value of 125. Index form is commonly used in algebra and arithmetic to represent repeated multiplication efficiently.
65