Answer:
f(x) is strictly monotonically decreasing in [-5 , 0]
Explanation:
The function f(x) will be
I )monotonically decreasing in an intervel (a ,b)
iff f'(x) ≤ 0 ∀ x ∈ ( a , b) [ when f(x) is derivable in (a,b)]
II) strictly monotonically decreasing in an intervel (a ,b)
iff f'(x) < 0 ∀ x ∈ ( a , b) [ when f(x) is derivable in (a,b)]
Here, although f(x) is not specified, but from the graph it is evident that f(x) is strictly monotonically decreasing in [-5 , 0]
1. x ∈ (a , b) means a < x <b
2. x ∈ [a, b) means a ≤ x < b
3. x ∈ (a , b] means a < x ≤ b
4. x ∈ [a , b] means a ≤ x ≤b
This is how interval notations are used.