Which of the following describes the sum p+(-q) where p and q are positive numbers
The sum p+(-q) is equal to p-q.
The sum P + - Q is the number located a distance Q from P in the negative direction
On the number line, the arrow is pointing to the one position, and P is in the five position
-20
-11
-13
To evaluate the sum p + (-q), you'll need to remember that adding a negative number is the same as subtracting the positive version of that number.
So, p + (-q) can be rewritten as p - q.
Therefore, the sum p + (-q) is equal to p minus q.
To find the sum p + (-q), you can follow these steps:
1. Start with the value of p, which is a positive number.
2. To get -q, you need to change the sign of q and make it negative.
3. If q is positive, to change the sign to negative, multiply it by -1. This will give you -q.
4. Now, add p and -q together.
For example, let's say p is 5 and q is 3.
To get -q, change the sign of q by multiplying it by -1. So, -q = -3.
Add p (5) and -q (-3) together: 5 + (-3) = 2.
Therefore, the sum p + (-q) where p and q are positive numbers is 2.