The
amount of field goals that can be achieved in a football game can only be whole
number values. For example, a field goal can only be 5 or 6 but not 5.5, 5.6 or
5.7 and etc. Therefore this is a discrete random variable.
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Is there more to this question? I feel like there is not enough information. Perhaps the probability is low because in order to survive, she must work. Many jobs may not require schooling. Sorry if this didn’t help.
8h+54=200 because if the waiter makes 8 dollars an hour plus 54 dollars in tips, that’s the equation.
A = 4,
we denote one side of the rectangle with
a
, and the other with
b
we can write, that:
a
⋅
b
=
16
so we can write, that
b
=
16
a
Now we can write perimeter
P
as a function of
a
P
=
2
⋅
(
a
+
16
a
)
We are looking for the smallest perimeter, so we have to calculate derivative:
P
(
a
)
=
2
a
+
32
a
P
'
(
a
)
=
2
+
(
−
32
a
2
)
P
'
(
a
)
=
2
−
32
a
2
=
2
a
2
−
32
a
2
The extreme values can only be found in points where
P
'
(
a
)
=
0
P
'
(
a
)
=
0
⇔
2
a
2
−
32
=
0
2
a
2
−
32
=
0
x
a
2
−
16
=
0
×
x
.
.
a
2
=
16
×
×
x
a
=
−
4
or
a
=
4
Since, length is a scalar quantity, therefore, it cannot be negative,
When
a
=
4
,
b
=
16
4
b
=
4