Answer:
1
Step-by-step explanation:
The graph f(x) = |x| with vertex (0,0) becomes g(x) = -|x-8| whose vertex is (8,0). This means the range of the parent function y>0 becomes y<0. This is so because the new graph opens downward unlike the parent function which opens up. The domain does stay the same. Statement 1 is correct.
Answer:
Option 1. is true
Step-by-step explanation:
our original function is f(x)=IxI
let us do the transformation to this
step 1: Reflect it across x axis , hence it becomes f(x)=-IxI
now we shift it 8 units towards +ve x axis
Hence our new function is f(x)=-Ix-8I
let us analyse the options one by one
1. Domain , Earlier domain was all real numbers, now also f(x) =-Ix-8I is defined for all real numbers hence domain is same.
2. Opening direction: f(x)=-IxI opens up , f(x) =-Ix-8I opens down as it was reflected along x axis.
3. Range of f(x) =IxI is all positive real numbers , Range of f(x) =-Ix-8I is all negative real numbers
4. Vertex of f(x) =IxI is (0,0) and vertex of f(x) =-Ix-8I is (8,0)
Hence we see that only first option is true
