Which is the graph of the function f(x) = Negative StartRoot x EndRoot
On a coordinate plane, an absolute value graph starts at (0, 0) and goes down and to the right through (4, negative 2).
On a coordinate plane, an absolute value graph starts at (0, 0) and goes up to the left through (negative 4, 2).
On a coordinate plane, an absolute value graph starts at (0, 0) and goes down and to the left through (negative 4, negative 2).
On a coordinate plane, an absolute value graph starts at (0, 0) and goes up and to the right through (4, 2).
Answers
Given : f(x) = √(-x) , On a coordinate plane, an absolute value graph starts at (0, 0) and goes up and to the left through (- 4, 2).
To find : Choose correct statement regarding Domain & Range
Solution:
f(x) = √(-x)
x = - 4
=> f(-4) = √(-(-4))
=> f(-4) = √4
=> f(-4) = 2
-4 , 2 is point
f(x) = √(-x)
root of -ve is not defined
Hence
-x ≥ 0
=> x ≤ 0
=> The domain of the graph is all real numbers less than or equal to 0.
2 is one of the Range > 0
hence The range of the graph is all real numbers less than or equal to 0 is FALSE
Domain is less than or equal to 0. while Range is + ve hence The domain and range of the graph are the same is FALSE
The range of the graph is all real numbers. - FALSE
Range is only + ve numbers
The domain of the graph is all real numbers less than or equal to 0.
CORRECT STATEMENT
Which statements accurately describe the function f(x) = 3(StartRoot ...
Step-by-step explanation:
Negative is ur answer ma