Question

asked Feb 13, 2022 210k views

1 Answer

Mvb · Answer 1 · 2022-02-17T02:44:02+0000

Rule for even

$\\ \sf\longmapsto \boxed{\sf f(-x)=f(x),x\in D_f}$

Rule for odd

$\\ \sf\longmapsto \boxed{\sf f(-x)=-f(x),D_f}$

#1

$\\ \sf\longmapsto f(x)=√(x^2)-9$

$\\ \sf\longmapsto f(4)=√(4^2)-9=4-9=-5$

$\\ \sf\longmapsto f(-4)=√((-4)^2)=4-9=-5$

#2

$\\ \sf\longmapsto g(x)=|x-3|$

$\\ \sf\longmapsto g(2)=|2-3|=|-1|=1$

$\\ \sf\longmapsto g(-2)=|-2-3|=|-5|=5$

$\\ \sf\longmapsto -g(2)=-1$

#3

$\\ \sf\longmapsto f(x)=(x)/(x^2-1)$

$\\ \sf\longmapsto f(3)=(3)/(3^2-1)=(3)/(9-1)=(3)/(8)$

$\\ \sf\longmapsto f(-3)=(-3)/((-3)^2-1)=(-3)/(8)$

$\\ \sf\longmapsto -f(3)=(-3)/(8)$

#4

$\\ \sf\longmapsto g(x)=x+x^2$

$\\ \sf\longmapsto g(1)=1+(1)^2=2$

$\\ \sf\longmapsto g(-1)=-1+(-1)^2=0$

$\\ \sf\longmapsto -g(1)=-2$

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