In each case
y
{\displaystyle \scriptstyle {y}}
defined , for all values of
x
{\displaystyle \scriptstyle {x}}
(1)
y
=
a
x
−
b
{\displaystyle \scriptstyle {y={\frac {a}{x-b}}}}
Here the value of
y
{\displaystyle \scriptstyle {y}}
defined for all values of
x
{\displaystyle \scriptstyle {x}}
x
=
b
{\displaystyle \scriptstyle {x=b}}
x
=
b
{\displaystyle \scriptstyle {x=b}}
y
{\displaystyle \scriptstyle {y}}
[1]
(2)
y
=
x
{\displaystyle \scriptstyle {y={\sqrt {x}}}}
In this case the function is defined only for positive values of
x
{\displaystyle \scriptstyle {x}}
x
{\displaystyle \scriptstyle {x}}
y
{\displaystyle \scriptstyle {y}}
(3)
y
=
log
a
x
.
a
>
0
{\displaystyle \scriptstyle {y=\log _{a}x.\qquad \qquad \qquad a>0}}
Here
y
{\displaystyle \scriptstyle {y}}
x
{\displaystyle \scriptstyle {x}}
x
{\displaystyle \scriptstyle {x}}
§ 19 ).
(4)
y
=
a
r
c
s
i
n
x
,
y
=
a
r
c
c
o
s
x
{\displaystyle \scriptstyle {y=\operatorname {arc~sin} x,y=\operatorname {arc~cos} x}}
Since sines and cosines cannot become greater than
+
1
{\displaystyle \scriptstyle {+1}}
−
1
{\displaystyle \scriptstyle {-1}}
defined for all values of
x
{\displaystyle \scriptstyle {x}}
−
1
{\displaystyle \scriptstyle {-1}}
+
1
{\displaystyle \scriptstyle {+1}}
1. Given
f
(
x
)
=
x
3
−
10
x
2
+
31
x
−
30
{\displaystyle \scriptstyle {f(x)=x^{3}-10x^{2}+31x-30}}
f
(
0
)
=
−
30
,
f
(
2
)
=
0
,
f
(
3
)
=
f
(
5
)
,
f
(
1
)
>
f
(
−
3
)
,
f
(
−
1
)
=
−
6
f
(
6
)
.
f
(
y
)
=
y
3
−
10
y
2
+
31
y
−
30
,
f
(
a
)
=
a
3
−
10
a
2
+
31
a
−
30
,
f
(
y
z
)
=
y
3
z
3
−
10
y
2
z
2
+
31
y
z
−
30
,
f
(
x
−
2
)
=
x
3
−
16
x
2
+
83
x
−
140
,
{\displaystyle {\begin{array}{c c}{\begin{aligned}\scriptstyle {f(0)}&\scriptstyle {=-30,}\\\scriptstyle {f(2)}&\scriptstyle {=0,}\\\scriptstyle {f(3)}&\scriptstyle {=f(5),}\\\scriptstyle {f(1)}&\scriptstyle {>f(-3),}\\\scriptstyle {f(-1)}&\scriptstyle {=-6f(6).}\end{aligned}}&{\begin{aligned}\scriptstyle {f(y)}&\scriptstyle {=y^{3}-10y^{2}+31y-30,}\\\scriptstyle {f(a)}&\scriptstyle {=a^{3}-10a^{2}+31a-30,}\\\scriptstyle {f(yz)}&\scriptstyle {=y^{3}z^{3}-10y^{2}z^{2}+31yz-30,}\\\scriptstyle {f(x-2)}&\scriptstyle {=x^{3}-16x^{2}+83x-140,}\\\scriptstyle {}\end{aligned}}\end{array}}}
2. If
f
(
x
)
=
x
3
−
3
x
+
2
{\displaystyle \scriptstyle {f(x)=x^{3}-3x+2}}
f
(
0
)
,
f
(
1
)
,
f
(
−
1
)
,
f
(
−
1
2
)
,
f
(
1
1
3
)
{\displaystyle \scriptstyle {f(0),\ f(1),\ f(-1),\ f(-{\frac {1}{2}}),\ f(1{\frac {1}{3}})}}
3. If
f
(
x
)
=
x
3
−
10
x
2
+
31
x
−
30
{\displaystyle \scriptstyle {f(x)=x^{3}-10x^{2}+31x-30}}
ϕ
(
x
)
=
x
4
−
55
x
2
−
210
x
−
216
{\displaystyle \scriptstyle {\phi (x)=x^{4}-55x^{2}-210x-216}}
f
(
2
)
=
ϕ
(
−
2
)
,
f
(
3
)
=
ϕ
(
−
3
)
,
f
(
5
)
=
ϕ
(
−
4
)
,
f
(
0
)
+
ϕ
(
0
)
+
246
=
0
{\displaystyle \scriptstyle {f(2)=\phi (-2),\ f(3)=\phi (-3),\ f(5)=\phi (-4),\ f(0)+\phi (0)+246=0}}
4. If
F
(
x
)
=
2
x
{\displaystyle \scriptstyle {F(x)=2^{x}}}
F
(
0
)
,
F
(
−
3
)
,
F
(
1
2
)
,
F
(
−
1
)
{\displaystyle \scriptstyle {F(0),\ F(-3),\ F({\frac {1}{2}}),\ F(-1)}}
5. Given
F
(
x
)
=
x
(
x
−
1
)
(
x
+
6
)
(
x
−
1
2
)
(
x
+
5
4
)
{\displaystyle \scriptstyle {F(x)=x(x-1)(x+6)(x-{\frac {1}{2}})(x+{\frac {5}{4}})}}
F
(
0
)
=
F
(
1
)
=
F
(
−
6
)
=
F
(
1
2
)
=
F
(
−
5
4
)
=
0
{\displaystyle \scriptstyle {F(0)=F(1)=F(-6)=F({\frac {1}{2}})=F(-{\frac {5}{4}})=0}}
