Sure! Here are the products of the given integers:
1. (+6)(+3) = +18
The product of positive 6 and positive 3 is +18.
2. (-7)(-4) = +28
The product of negative 7 and negative 4 is positive 28.
3. (+5)(-2) = -10
The product of positive 5 and negative 2 is -10.
4. (4)(+6) = +24
The product of positive 4 and positive 6 is +24.
5. (-2)(8) = -16
The product of negative 2 and positive 8 is -16.
In multiplication, when two integers with the same sign are multiplied, the product is positive. When two integers with different signs are multiplied, the product is negative.
step by step explanation.
Certainly! In mathematics, when we multiply two numbers (integers in this case), the sign of the product depends on the signs of the numbers being multiplied.
1. (+6)(+3) = +18:
When you multiply a positive number (+6) by another positive number (+3), the product is positive (+18). This is because multiplication of positive numbers always results in a positive product.
2. (-7)(-4) = +28:
When you multiply two negative numbers (-7 and -4), the product is positive (+28). This is because a negative multiplied by a negative gives a positive result.
3. (+5)(-2) = -10:
When you multiply a positive number (+5) by a negative number (-2), the product is negative (-10). This is because a positive multiplied by a negative gives a negative result.
4. (4)(+6) = +24:
When you multiply a positive number (+4) by another positive number (+6), the product is positive (+24). As mentioned before, multiplication of positive numbers yields a positive product.
5. (-2)(8) = -16:
When you multiply a negative number (-2) by a positive number (+8), the product is negative (-16). Similarly, a negative multiplied by a positive gives a negative result.
So, in summary, the rules for the signs of products in multiplication are:
- A positive multiplied by a positive gives a positive product.
- A negative multiplied by a negative gives a positive product.
- A positive multiplied by a negative gives a negative product.
- A negative multiplied by a positive also gives a negative product.
These rules of signs in multiplication are consistent throughout mathematics.
Answers & Comments
answer
Sure! Here are the products of the given integers:
1. (+6)(+3) = +18
The product of positive 6 and positive 3 is +18.
2. (-7)(-4) = +28
The product of negative 7 and negative 4 is positive 28.
3. (+5)(-2) = -10
The product of positive 5 and negative 2 is -10.
4. (4)(+6) = +24
The product of positive 4 and positive 6 is +24.
5. (-2)(8) = -16
The product of negative 2 and positive 8 is -16.
In multiplication, when two integers with the same sign are multiplied, the product is positive. When two integers with different signs are multiplied, the product is negative.
step by step explanation.
Certainly! In mathematics, when we multiply two numbers (integers in this case), the sign of the product depends on the signs of the numbers being multiplied.
1. (+6)(+3) = +18:
When you multiply a positive number (+6) by another positive number (+3), the product is positive (+18). This is because multiplication of positive numbers always results in a positive product.
2. (-7)(-4) = +28:
When you multiply two negative numbers (-7 and -4), the product is positive (+28). This is because a negative multiplied by a negative gives a positive result.
3. (+5)(-2) = -10:
When you multiply a positive number (+5) by a negative number (-2), the product is negative (-10). This is because a positive multiplied by a negative gives a negative result.
4. (4)(+6) = +24:
When you multiply a positive number (+4) by another positive number (+6), the product is positive (+24). As mentioned before, multiplication of positive numbers yields a positive product.
5. (-2)(8) = -16:
When you multiply a negative number (-2) by a positive number (+8), the product is negative (-16). Similarly, a negative multiplied by a positive gives a negative result.
So, in summary, the rules for the signs of products in multiplication are:
- A positive multiplied by a positive gives a positive product.
- A negative multiplied by a negative gives a positive product.
- A positive multiplied by a negative gives a negative product.
- A negative multiplied by a positive also gives a negative product.
These rules of signs in multiplication are consistent throughout mathematics.
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