Use division to find the quotient of the two following scientific notations. Your answer should be written in scientific notation form.
9 x 10^5/10 x 10^3
To divide the two scientific notations, we first divide the coefficients and then subtract the exponents.
The coefficient of the first scientific notation is 9, and the coefficient of the second scientific notation is 10. Dividing 9 by 10 gives us 0.9.
The exponent of the first scientific notation is 5, and the exponent of the second scientific notation is 3. Subtracting 3 from 5 gives us 2.
Therefore, the quotient of the two scientific notations is 0.9 x 10^2.
Written in scientific notation form, the answer is 9 x 10^1 or 90.
To find the quotient of two numbers written in scientific notation, we can divide the coefficients and subtract the exponents.
The problem is: (9 x 10^5)/(10 x 10^3)
First, divide the coefficients: 9 ÷ 10 = 0.9
Then subtract the exponents: 5 - 3 = 2
Thus, the quotient is 0.9 x 10^2 in scientific notation form.
To divide two numbers written in scientific notation, you can divide their coefficients and subtract their exponents. Here's how to do it step by step:
Step 1: Divide the coefficients (numbers in front of the powers of 10):
9 / 10 = 0.9
Step 2: Subtract the exponents (powers of 10):
5 - 3 = 2
Step 3: Write your answer in scientific notation form:
0.9 x 10^2
Therefore, the quotient of 9 x 10^5 divided by 10 x 10^3 is 0.9 x 10^2.