Two numbers are multiplicative inverses when their product results in .
For example:
and are multiplicative inverses because
Two numbers are multiplicative inverses when their product results in .
For example:
and are multiplicative inverses because
Whenever a is different from , it follows that
Division is equivalent to multiplication by its multiplicative inverse,
That is:
Because is the multiplicative inverse of
Generally:
\( 0+0.2+0.6= \)
Two numbers are multiplicative inverses when their multiplication results in .
For example:
and are multiplicative inverses because
More examples:
The multiplicative inverse of is
The multiplicative inverse of is
The multiplicative inverse of is
The multiplicative inverse of is
The multiplicative inverse of is
The multiplicative inverse of is
Whenever a is different from , it happens that
\( 12+3\times0= \)
\( 12+1+0= \)
\( 8\times(5\times1)= \)
Division is equivalent to multiplication by the multiplicative inverse,
that is:
This is because is the multiplicative inverse of
In general:
Solve the following exercises
According to the order of operations rules, since the exercise only involves addition operations, we will solve the problem from left to right:
0.8
According to the order of operations, we first multiply and then add:
12
According to the order of operations rules, since the exercise only involves addition operations, we will solve the problem from left to right:
13
According to the order of operations, we first solve the expression in parentheses:
Now we multiply:
40
According to the order of operations rules, since the exercise only involves addition and subtraction, we will solve the problem from left to right:
9.5
\( 9-0+0.5= \)
Solve the following exercise:
\( 12+3\cdot0= \)
\( 0:7+1= \)