Please help! This is due in 15 minutes.
I don't understand how do I solve the last two questions. The ones based on based on the minimum and maximum points of the transformed function.
I'm countin' on you. Please answer ASAP!
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time answered:after 5 min.
therefore:y=f(x)
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That's pretty simple, William.
What you ought to do is just identify whether the transformation takes in the input or the output of the parent function.
- If the transformation takes place in the input, reflect the same in the respective max/min x co-ordinate.
- If the transformation takes place in the output, reflect the same in the respective max/min y coordinate.
According to the aforementioned rules, you may easily conclude your answers, which are:
For Question#3 :
- A) y = f(-x) -» Max: (5, 10) , Min: (-1, -8)
- B) y = f(x) + 2 -» Max: (-5,12) , Min: (1,-6)
- C) y = f(x - 2) -»Max: (-3,10) , Min: (3, -8)
- D) y = -f(x) -» Max: (1, 8) , Min: (-5, -10)
For Question#4 :
- A) y = f(x-1)
- B) y = f(x) + 5
- C) y = f(x - 3)
- D) y = f(x + 3)
Note that :
For determining the equation of the transformed function, reverse follow the same steps.
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