How is the sine of the quotient determined? The sign of the quotient is the same as the larger number the quotient is positive if signs of the divisor and dividend Ara, like the sound of the quotient is the same as the smaller number the quotient is negative if the divisor in division are like.
I'm sorry, but I'm not able to understand the question fully. Could you please provide more context or clarify your question?
How is the sine of the quotient determined?
A: The sign of the quotient is the same as the larger number
B:the quotient is positive if signs of the divisor and dividend Are alike
C: the sound of the quotient is the same as the smaller number
D the quotient is negative if the divisor in division are alike
The correct statement is:
B: the quotient is positive if signs of the divisor and dividend are alike.
In other words, if both the divisor and dividend have the same sign (either both positive or both negative), then the quotient will be positive. If the signs are different (one positive and one negative), then the quotient will be negative. The size of the numbers does not determine the sign of the quotient.
If the walkers deducted $850 each month last year from the checking account to pay for child care what was the effect on there checking sounds + 850
-10,200
10,200
-850
The effect on their checking account would be a decrease of $10,200. So the correct answer is:
-10,200
What is the quotient of −37.44 ÷−0.9?(1 point)
It seems that there is some confusion in your question. The sine function is used to calculate the ratio of the length of the side opposite to an angle in a right triangle to the length of the hypotenuse. It is not directly related to quotients or signs of numbers.
If you are referring to determining the sign of the quotient when dividing two numbers, here is the explanation:
To determine the sign of the quotient when dividing two numbers, you need to consider the signs of the dividend (the number being divided) and the divisor (the number that divides the dividend).
1. If both the dividend and divisor have the same sign (both positive or both negative), the quotient will be positive. For example: 10 ÷ 2 = 5 or (-10) ÷ (-2) = 5.
2. If the dividend and divisor have different signs (one positive and one negative), the quotient will be negative. For example: (-10) ÷ 2 = -5 or 10 ÷ (-2) = -5.
In summary, the sign of the quotient is determined by the signs of the dividend and divisor. If they have the same sign, the quotient is positive, and if they have different signs, the quotient is negative.