What is the quotient of −920 divided by 40? Which integer rule determines the sign of the quotient?
A) 23; The quotient of integers with unlike signs is positive.
B) −23; The quotient of integers with unlike signs is negative.
C) 23; The sign of the quotient of integers with unlike signs is the sign of the number with the greater value.
D) −23; The sign of the quotient of integers with unlike signs is the sign of the number with the greater absolute value.
It has to be b or d.
oh i mean o its b
The correct answer is B) −23. The quotient of integers with unlike signs is negative. Since one of the numbers is negative (-920) and the other is positive (40), the quotient will be negative. Therefore, the answer is -23.
To find the quotient of −920 divided by 40, you can simply divide 920 by 40. The division would result in a quotient of 23. However, when dealing with integers, there is a rule that determines the sign of the quotient.
According to the rule, the sign of the quotient of integers with unlike signs is negative. In this case, −920 is negative and 40 is positive, so the quotient should be negative.
Therefore, the correct answer is B) −23.