Set A represents rational numbers. Set B represents integers. Which Venn diagram shows the numbers placed in correct sets?
As a text-based AI, I am unable to provide visual content such as Venn diagrams. However, I can describe the Venn diagram that shows the numbers placed correctly in the sets A and B.
The Venn diagram would consist of two overlapping circles. One circle would represent set A for rational numbers, and the other circle would represent set B for integers. The overlapping region of the two circles would indicate the numbers that are both rational and integers.
In terms of placement, all the rational numbers would be placed within the circle representing set A, including fractions, decimals, and whole numbers. The integers, which include positive and negative whole numbers as well as zero, would be placed within the circle representing set B.
Lastly, the overlapping region of the two circles would contain the integers since every integer is also a rational number.
Please note that without a visual representation, it may be easier to understand the placement of numbers if you refer to an actual Venn diagram or create one yourself.
Determine the sign of the product of 17/32×(−1/10).(1 point) Responses both positive and negative both positive and negative negative negative The product has no sign. The product has no sign. positive
The sign of the product of 17/32 × (-1/10) is negative.
Determine the sign of the product of −0.708×−6.24.(1 point)
Responses
The product has no sign.
The product has no sign.
both positive and negative
both positive and negative
positive
positive
negative
The sign of the product of -0.708 × -6.24 is positive.
Multiply −5×(−4).(1 point)
Responses
−9
negative 9
−20
negative 20
9
9
20
20
The product of -5 × (-4) is 20.
Multiply 11×−9.(1 point)
Responses
−2
negative 2
99
99
2
2
−99
The product of 11 × (-9) is -99.
Which of the following shows the Commutative Property of Multiplication?(1 point)
Responses
a×1=a
a times 1 equals a
a×(b×c)=(a×b)×c
a times left parenthesis b times c right parenthesis equals left parenthesis a times b right parenthesis times c
a×(−1)=−a
a times left parenthesis negative 1 right parenthesis equals negative a
a×b=b×a