What is the quotient of 100÷(−10)÷5?
To solve this expression, we use the order of operations, which states that we should perform the operations inside parentheses first, then any exponents, then multiplication and division from left to right, and finally addition and subtraction from left to right.
The expression can be rewritten as 100 ÷ (-10) ÷ 5. Since multiplication and division are of equal precedence, we can rewrite this expression as 100 ÷ -10 ÷ 5.
First, we divide 100 by -10, which equals -10: -10 ÷ 5.
Then, we divide -10 by 5, which equals -2: -2.
Therefore, the quotient of 100 ÷ (-10) ÷ 5 is -2.
To find the quotient of 100 ÷ (-10) ÷ 5, we'll follow the order of operations, which is parentheses, exponents, multiplication and division (from left to right), and addition and subtraction (from left to right).
Let's start by evaluating the expression inside the parentheses: 100 ÷ (-10).
Dividing 100 by -10, we get -10.
Now, let's take the result (-10) and divide it by 5: -10 ÷ 5.
Dividing -10 by 5, we get -2.
Therefore, the quotient of 100 ÷ (-10) ÷ 5 is -2.