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curve sketching help! (1 Viewer)

z3192422

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give y= f(x)
sc.PNG
sketch y=f'(x), y=1/(x), y=f(lxl), y=f(x+1)
plz explain in full detail>thnx
 
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hscishard

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y=f(x) is impossible to sketch
...
y=1/f(x)
x intercepts become vertical asymptotes
the vertical asymptotes become 0 in the reciprocal function
It should be easy from here. If it's low and positive, it'll be high and positive

y=f[|x|]
Pretty much two f(x) for x>0, with the y axis being the axis of symmetry

last one you just shift everything one space back
 

iSplicer

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y=f(x) is impossible to sketch
...
y=1/f(x)
x intercepts become vertical asymptotes
the vertical asymptotes become 0 in the reciprocal function
It should be easy from here. If it's low and positive, it'll be high and positive

y=f[|x|]
Pretty much two f(x) for x>0, with the y axis being the axis of symmetry

last one you just shift everything one space back
For y=1/f(x)

dy/dx = -f'(x) /[f(x)]^2 (denominator is strictly positive, so its consideration regarding the sign of dy/dx is superfluous)

so we have: the sign of dy/dx = the opposite sign of f'(x). What does this tell us? When f(x) is decreasing, 1/f(x) will be increasing and vice versa. This should also be good help. You can differentiate it again to prove the concavity but for a 2 marker in the HSC, i'm not sure how useful this'll be.
 

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