Answer
Step 1: Use Reverse of Distributive law as follows:
$a(-b)+ab=a[-b+b]$
Step 2: Since the sum of the opposites is zero.
We get, $a(-b)+ab=a(0)$
Step 3: Since the product of $0$ with any real number is $0$.
We get, $a(-b)+ab=0$
Step 4: Since the sum of $a(-b)$ and $ab$ is zero.
$a(-b)$ and $ab$ must be opposites of each other.
Also, $a>0$ and $b>0$, that is, $ab>0$
Hence, $a(-b)$ is negative of $ab$.
Work Step by Step
Step 1: Use Reverse of Distributive law as follows:
$a(-b)+ab=a[-b+b]$
Step 2: Since the sum of the opposites is zero.
We get, $a(-b)+ab=a(0)$
Step 3: Since the product of $0$ with any real number is $0$.
We get, $a(-b)+ab=0$
Step 4: Since the sum of $a(-b)$ and $ab$ is zero.
$a(-b)$ and $ab$ must be opposites of each other.
Also, $a>0$ and $b>0$, that is, $ab>0$
Hence, $a(-b)$ is negative of $ab$.
