Answer:
1. D
2. A
3. D
Step-by-step explanation:
1.
To solve the equation [tex]x^2=40[/tex], we need to take "square root" of both the sides so we can isolate the variable "x".
Note: When taking square root, we need both positive(+) and negative(+) value as both positive & negative value's square is same.
Thus,
[tex]x^2=40\\\sqrt{x^2} =+-\sqrt{40}\\ x=+-\sqrt{40}[/tex]
Answer choice D is right.
2.
So we need to take square root of both the sides to isolate the variable x and solve. Thus:
[tex]x^2=-169\\\sqrt{x^2}=\sqrt{-169}\\ x=\sqrt{-169}[/tex]
Now, we CANNOT TAKE THE SQUARE ROOT OF A NEGATIVE NUMBER. Hence, we cannot solve this. It is UNDEFINED.
Answer choice A is right.
3.
A square has an area given by [tex]s^2[/tex], where s is side length.
Equating the area to 79 and solving for s gives us the length of one side of the rug (remember to take square root of both sides to isolate s):
[tex]s^2=79\\\sqrt{s^2}=\sqrt{79} \\ s=\sqrt{79} =8.89[/tex]
Note: we disregarded the negative value of -8.89 because length CANNOT BE NEGATIVE!
Hence, answer choice D is right.
