Remainder and Factor Theorem Applications
Number Theory
The product of three binomials is 2x3 + 7x2
– 7x – 12. If one binomial is x + 1, what are the other two binomials?
Solution:
x = -1
Apply the Synthetic Division:
2
|
7
|
-7
|
-12
|
|
-1
|
2
|
5
|
-12
|
0
|
= 2x2 + 5x - 12
2x2 + 5x – 12
a =2, b = 5, c = -12
x = -b ± √b2 - 4ac / 2a
x = -5 ± √52 – 4(2)(-12)
/ 2(2)
x = -5 ± √25 + 96 / 4
x = -5 ± √121 / 4
x1 = -5 + 11 / 4
x1 = 6/4
x1 = 3/2 |
x2 = -5 – 11 / 4
x2 = -16/4
x2 = -4
|
Answer: The other two binomials are (2x - 3) and (x + 4).
Check:
(x + 1) (2x - 3) (x + 4) ≟ 2x3 + 7x2
– 7x – 12
(2x2 –
x - 3)(x + 4) ≟ 2x3 +
7x2 – 7x – 12
2x3 +
7x2 – 7x – 12 =
2x3 + 7x2 – 7x – 12
Therefore, 2x3 + 7x2
– 7x – 12 is the product of the three binomials (x + 1), (2x - 3), and
(x + 4).
Number Theory
Martha represented three consecutive even integers in a
unique way. If the product of the three integers is represented by x3
– 12x2 + 44x – 48, and one integer is represented by
x – 4, what expressions did Martha use for the other integers? Could she have used a different set of expressions?
x – 4, what expressions did Martha use for the other integers? Could she have used a different set of expressions?
Solution:
x = 4
x = 4
Apply the Synthetic Division:
1
|
-12
|
44
|
-48
|
|
4
|
1
|
-8
|
12
|
0
|
= x2 – 8x + 12
Factor:
x2 – 8x + 12
Factor:
x2 – 8x + 12
= (x – 6)(x – 2)
x = 6
|
x = 2
|
Answer: Martha used the expression (x - 6) and (x - 2) for the other integers. Yes, she have used a different set of expressions.
Check:
(x – 4)(x – 6)(x – 2) ≟ x3 – 12x2 +
44x – 48
(x2 – 10x + 24)(x - 2) ≟ x3
– 12x2 + 44x – 48
x3 –
12x2 + 44x – 48 = x3 – 12x2 +
44x – 48
Therefore, x3
– 12x2 + 44x – 48 is the product of the three consecutive even integers (x – 4), (x – 6), and (x – 2) Martha represented.
Number Theory
Hector represented
the product of four numbers as x4 – x3 – 10x2
– 8x. One number was represented by x and another by x + 1. What expressions
were used to represent the other two numbers?
Solution:
Divide first by x:
x4 – x3 – 10x2 – 8x / x
= x3 – x2 – 10x – 8
x = -1
Apply the Synthetic Division:
1
|
-1
|
-10
|
-8
|
|
-1
|
1
|
-2
|
-8
|
0
|
= x2 – 2x – 8
Factor:
x2 – 2x – 8
Factor:
x2 – 2x – 8
= (x + 2)(x – 4)
x = -2
|
x = 4
|
The expressions (x + 2) and (x - 4) were used to represent the other two numbers.
x(x + 1)(x + 2)(x – 4) ≟ x4 – x3 – 10x2 – 8x
(x2 + x)(x + 2)(x – 4) ≟ x4
– x3 – 10x2 – 8x
(x3 + 3x2 + 2x)(x – 4) ≟
x4 – x3 – 10x2 – 8x
x4 – x3 – 10x2 – 8x =
x4 – x3 –
10x2 – 8x
Therefore, x4 – x3 – 10x2
– 8x is the product of four numbers x, (x + 1), (x + 2), and
(x – 4) represented by Hector.
Geometry
If the volume of a
box is represented by the expression (x3 – 3x2 – 10x +
24) cm3 and its width by
(x - 2) cm, what binomials can be used to
represent the other two dimensions?
Solution:
x = 2
Apply the Synthetic Division:
1
|
-3
|
-10
|
24
|
|
2
|
1
|
-1
|
-12
|
0
|
= x2 – x – 12
Factor:
x2 – x – 12
Factor:
x2 – x – 12
= (x + 3)(x -4)
x = -3
|
x = 4
|
Answer: The binomials (x + 3) cm and (x -4) cm can be used to
represent the other two dimensions.
Check:
(x - 2)(x + 3)(x - 4) ≟ x3 – 3x2 – 10x +
24
(x2 + x – 6)(x – 4) ≟ x3 – 3x2 – 10x +
24
x3 – 3x2 – 10x +
24 = x3 – 3x2 – 10x +
24
Therefore, x3 – 3x2 – 10x + 24 cm3 is the expression that represents the volume of the box with dimensions of (x - 2) cm, (x + 3) cm,and (x - 4) cm.
Therefore, x3 – 3x2 – 10x + 24 cm3 is the expression that represents the volume of the box with dimensions of (x - 2) cm, (x + 3) cm,and (x - 4) cm.
Geometry
If the volume of a box is represented by the expression (a3x3
– 6a2x2 + 11ax – 6) cm3 and its length is
(ax – 1) cm, what
binomials can be used to represent the other two dimensions?
Solution:
Divide:
a3x3 – 6a2x2 + 11ax
– 6 / ax - 1= a2x2 - 5ax + 6
Factor:
a2x2 -
5ax + 6
= (ax-3)(ax-2)
ax = 3
|
ax = 2
|
Answer: The binomials (ax - 3) cm and (ax - 2) cm can be used to represent the other two dimensions.
Check:
(ax - 1)(ax - 3)(ax - 2) ≟ a3x3
– 6a2x2 + 11ax – 6
(a2x2 - 4ax + 3)(ax - 2) ≟ a3x3
– 6a2x2 + 11ax – 6
a3x3
– 6a2x2 + 11ax – 6 = a3x3
– 6a2x2 + 11ax – 6
Therefore, (a3x3 – 6a2x2 + 11ax – 6) cm3 is the expression that represents the volume of a box with dimensions of (ax - 1) cm, (ax - 3) cm, and (ax - 2) cm.
Therefore, (a3x3 – 6a2x2 + 11ax – 6) cm3 is the expression that represents the volume of a box with dimensions of (ax - 1) cm, (ax - 3) cm, and (ax - 2) cm.
More Applications
1. The product of three binomials is
3x3 + x2 – 27x - 9. If one binomial is x - 3, what are the other two binomials?
x = 3
Apply the Synthetic Division:
3
|
1
|
-27
|
-9
|
|
3
|
3
|
10
|
3
|
0
|
= 3x2 + 10x + 3
Factor:
3x2 + 10x + 3
= (3x + 1)(x + 3)
x = -1/3
|
x = -3
|
Answer: The other two binomials are (3x + 1) and (x + 3).
Check:
(x - 3)(x + 3)(3x + 1) ≟ 3x3 + x2 – 27x - 9
(x2 - 9)(3x + 1) ≟ 3x3 + x2 – 27x - 9
3x3 + x2 – 27x - 9 = 3x3 + x2 – 27x - 9
Therefore, (x - 3), (x + 3), and (3x + 1) are factors of 3x3 + x2 – 27x - 9.
Therefore, (x - 3), (x + 3), and (3x + 1) are factors of 3x3 + x2 – 27x - 9.
2. The product of three binomials is 2x3 - x2 – 8x + 4. If one binomial is x
- 2, what are the other two binomials?
x = 2
Apply the Synthetic Division:
2
|
-1
|
-8
|
4
|
|
2
|
2
|
3
|
-2
|
0
|
= 2x2 + 3x -2
Factor:
2x2 + 3x -2
= (2x – 1)(x + 2)
x = 1/2
|
x = -2
|
Answer: The other two binomials are (2x - 1) and (x + 2).
Check:
(x - 2)(2x - 1)(x + 2) ≟ 2x3 - x2 – 8x + 4
(2x2 - 5x + 2)(x + 2) ≟ 2x3 - x2 – 8x + 4
2x3 - x2 – 8x + 4 = 2x3 - x2 – 8x + 4
Therefore, (x - 2), (2x - 1), and (x + 2) are factors of 2x3 - x2 – 8x + 4.
3. The product of three binomials is y3 - 4y2 – 7y + 10. If one binomial is y – 1, what are the other two binomials?
y = 1
Apply the Synthetic Division:
1
|
-4
|
-7
|
10
|
|
1
|
1
|
-3
|
-10
|
0
|
= y2 – 3y -10
Factor:
y2 – 3y -10
= (y + 2)(y - 5)
y = -2
|
y = 5
|
Answer: The other two binomials are (y + 2) and (y - 5).
Check:
(y - 1)(y + 2)(y - 5) ≟ y3 - 4y2 – 7y + 10
(y2 + y - 2)(y - 5) ≟ y3 - 4y2 – 7y + 10
y3 - 4y2 – 7y + 10 = y3 - 4y2 – 7y + 10
Therefore, y3 - 4y2 – 7y + 10 is the product of the binomials (y - 1), (y + 2), and (y - 5).
4. Veah represented the product of four numbers as y4
– 3y3 – 10y2 + 24y. One number was represented by y and
another by y - 4. What expressions were used to represent the other two
numbers?
Divide first by y:
y4 – 3y3 – 10y2 + 24y / y
= y3 – 3y2
– 10y + 24
y = 4
Apply the Synthetic Division:
1
|
-3
|
-10
|
24
|
|
4
|
1
|
1
|
-6
|
0
|
= y2 + y – 6
Factor:
y2 + y – 6
= (y +3)(y-2)
y = -3
|
y = 2
|
Answer: The expressions (y + 3) and (y - 2) were used to represent the other two numbers.
Check:
y(y - 4)(y +3)(y-2) ≟ y4 – 3y3 – 10y2 + 24y
(y2 - 4y)(y +3)(y-2) ≟ y4 – 3y3 – 10y2 + 24y
(y3 – y2 - 12y)(y - 2) ≟ y4 – 3y3 – 10y2 + 24y
y4 – 3y3 – 10y2 + 24y = y4 – 3y3 – 10y2 + 24y
Therefore, y4
– 3y3 – 10y2 + 24y is the product of the four integers y, (y - 4), (y + 3), and (y - 2) Veah represented.
Multiply:
(x - 4)(x + 3)(x - 2) = (x2 – x - 12)(x - 2)
(x - 4)(x + 3)(x - 2) = x3 - 3x2 – 10x + 24
Answer: The product should be represented as x3 - 3x2 – 10x + 24.
Check:
x3 - 3x2 – 10x + 24 / (x - 4)(x + 3)(x - 2)
Use the Synthetic Division:
| 1 | -3 | -10 | 24 | |
| 4 | 1 | 1 | -6 | 0 |
= x2 + x - 6
Factor:
x2 + x - 6
= (x + 3)(x - 2)
x = -3
|
x = 2
|
Therefore, (x - 4), (x + 3), and (x -2) are factors of x3 - 3x2 – 10x + 24.
“Prime numbers are what is left when you have taken all the patterns away. I think prime numbers are like life. They are very logical, but you could never work out the rules, even if you spent all your time thinking about them.”
― Mark Haddon
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