Answer:
The volume of a rectangular prism is simply the product of its three dimensions: in your case, the volume of the prism is, given Β
x
,
(
x
+
6
)
(
x
β
2
)
(
x
β
1
)
.
A polynomial is a sum (with some coefficients) of powers of Β
x
, so, if we expand the product just written, we have
(
(
x
+
6
)
(
x
β
2
)
)
(
x
β
1
)
=
(
x
2
β
2
x
+
6
x
β
12
)
(
x
β
1
)
=
(
x
2
+
4
x
β
12
)
(
x
β
1
)
=
x
3
+
4
x
2
β
12
x
β
x
2
β
4
x
+
12
=
x
3
+
3
x
2
β
16
x
+
12
Which is a polynomial, and expresses the volume of the prism
Step-by-step explanation:
The volume of a rectangular prism is simply the product of its three dimensions: in your case, the volume of the prism is, given Β
x
,
(
x
+
6
)
(
x
β
2
)
(
x
β
1
)
.
A polynomial is a sum (with some coefficients) of powers of Β
x
, so, if we expand the product just written, we have
(
(
x
+
6
)
(
x
β
2
)
)
(
x
β
1
)
=
(
x
2
β
2
x
+
6
x
β
12
)
(
x
β
1
)
=
(
x
2
+
4
x
β
12
)
(
x
β
1
)
=
x
3
+
4
x
2
β
12
x
β
x
2
β
4
x
+
12
=
x
3
+
3
x
2
β
16
x
+
12
Which is a polynomial, and expresses the volume of the prism
