What is the quotient of 5.76 X 10^7 and 9.0 X 10^4
To find the quotient, we need to divide 5.76 × 10^7 by 9.0 × 10^4.
When dividing numbers written in scientific notation, we can divide the decimal parts and divide the powers of 10 separately.
So, 5.76 × 10^7 ÷ 9.0 × 10^4 can be written as (5.76 ÷ 9.0) × (10^7 ÷ 10^4).
The division of the decimal parts is 5.76 ÷ 9.0, which is equal to 0.64.
The division of the powers of 10 is 10^7 ÷ 10^4, which is equal to 10^(7-4) = 10^3.
Putting it all together, the quotient of 5.76 × 10^7 ÷ 9.0 × 10^4 is 0.64 × 10^3, or 6.4 × 10^2.
To find the quotient, we need to divide the numbers. Let's divide 5.76 x 10^7 by 9.0 x 10^4.
Step 1: Divide the numerical part: 5.76 ÷ 9.0 = 0.64.
Step 2: Divide the exponential part: 10^7 ÷ 10^4 = 10^(7-4) = 10^3.
Step 3: Combine the results from step 1 and step 2: 0.64 x 10^3.
The quotient of 5.76 x 10^7 and 9.0 x 10^4 is 0.64 x 10^3.
To find the quotient of two numbers in scientific notation, you can divide the coefficients and subtract the exponents.
Given:
5.76 x 10^7
9.0 x 10^4
Step 1: Divide the coefficients.
5.76 / 9.0 = 0.64
Step 2: Subtract the exponents.
10^7 / 10^4 = 10^(7-4) = 10^3
So, the quotient is 0.64 x 10^3.
In non-scientific notation, this can be written as 640.