4. the quadratic expression ( x^2 - 8x + 10 ) has its smallest value for some integer value of ( x ) on the interval ( 0 leq x leq 10 ). set up a table to find the smallest value of the expression and the value of ( x ) that gives this value. show your table below.

5. consider the complex expression ( (x + 7)(x + 3) + (x - 1)(x - 4) ).

(a) multiply the two sets of binomials and combine like terms in order to write this expression as an equivalent trinomial in standard form. show your work.

(b) set up a table to verify that your answer in part (a) is equivalent to the original expression. dont hesitate to point out that it is not equivalent (which means you either made a mistake in your algebra or in your table set up). show your table.

6. the product of three binomials is shown below. write this product as a polynomial in standard form. (its highest power will be ( x^3 )).

( (x - 1)(x + 2)(x - 4) )

7. set up a table for the answer you found in #6 on the interval ( -5 leq x leq 5 ). where does this expression have zeroes?

Question

4. the quadratic expression ( x^2 - 8x + 10 ) has its smallest value for some integer value of ( x ) on the interval ( 0 leq x leq 10 ). set up a table to find the smallest value of the expression and the value of ( x ) that gives this value. show your table below.

5. consider the complex expression ( (x + 7)(x + 3) + (x - 1)(x - 4) ).

(a) multiply the two sets of binomials and combine like terms in order to write this expression as an equivalent trinomial in standard form. show your work.

(b) set up a table to verify that your answer in part (a) is equivalent to the original expression. dont hesitate to point out that it is not equivalent (which means you either made a mistake in your algebra or in your table set up). show your table.

6. the product of three binomials is shown below. write this product as a polynomial in standard form. (its highest power will be ( x^3 )).

( (x - 1)(x + 2)(x - 4) )

7. set up a table for the answer you found in #6 on the interval ( -5 leq x leq 5 ). where does this expression have zeroes?

Accepted Answer

### Problem 4
# Explanation:
## Step1: Create table for integer x
| $x$ | $x^2 - 8x + 10$ |
|-----|-----------------|
| 0 | $0^2 -8(0)+10=10$ |
| 1 | $1^2 -8(1)+10=3$ |
| 2 | $2^2 -8(2)+10=-2$ |
| 3 | $3^2 -8(3)+10=-5$ |
| 4 | $4^2 -8(4)+10=-6$ |
| 5 | $5^2 -8(5)+10=-5$ |
| 6 | $6^2 -8(6)+10=-2$ |
| 7 | $7^2 -8(7)+10=3$ |
| 8 | $8^2 -8(8)+10=10$ |
| 9 | $9^2 -8(9)+10=19$ |
| 10 | $10^2 -8(10)+10=30$ |
## Step2: Identify minimum value
Scan the calculated values to find the smallest.
# Answer:
The smallest value is $-6$, which occurs when $x=4$.

---

### Problem 5 (a)
# Explanation:
## Step1: Multiply first binomial pair
$(x+7)(x+3) = x^2 +3x +7x +21 = x^2 +10x +21$
## Step2: Multiply second binomial pair
$(x-1)(x-4) = x^2 -4x -x +4 = x^2 -5x +4$
## Step3: Add and combine like terms
$(x^2 +10x +21) + (x^2 -5x +4) = 2x^2 +5x +25$
# Answer:
$2x^2 +5x +25$

---

### Problem 5 (b)
# Explanation:
## Step1: Choose test x values
Pick integer values for $x$ to test both expressions.
## Step2: Build verification table
| $x$ | Original Expression $(x+7)(x+3)+(x-1)(x-4)$ | Simplified Expression $2x^2+5x+25$ |
|-----|---------------------------------------------|------------------------------------|
| -2 | $(5)(1)+(-3)(-6)=5+18=23$ | $2(4)+5(-2)+25=8-10+25=23$ |
| -1 | $(6)(2)+(-2)(-5)=12+10=22$ | $2(1)+5(-1)+25=2-5+25=22$ |
| 0 | $(7)(3)+(-1)(-4)=21+4=25$ | $2(0)+5(0)+25=25$ |
| 1 | $(8)(4)+(0)(-3)=32+0=32$ | $2(1)+5(1)+25=2+5+25=32$ |
| 2 | $(9)(5)+(1)(-2)=45-2=43$ | $2(4)+5(2)+25=8+10+25=43$ |
## Step3: Confirm equivalence
All test values produce matching results, so the expressions are equivalent.
# Answer:
The table confirms the simplified expression $2x^2+5x+25$ is equivalent to the original expression.

---

### Problem 6
# Explanation:
## Step1: Multiply first two binomials
$(x-1)(x+2) = x^2+2x-x-2 = x^2+x-2$
## Step2: Multiply by third binomial
$(x^2+x-2)(x-4) = x^3-4x^2+x^2-4x-2x+8$
## Step3: Combine like terms
$x^3-3x^2-6x+8$
# Answer:
$x^3-3x^2-6x+8$

---

### Problem 7
# Explanation:
## Step1: Create table for $-5\leq x\leq5$
| $x$ | $x^3-3x^2-6x+8$ |
|-----|------------------|
| -5 | $(-125)-3(25)-6(-5)+8=-125-75+30+8=-162$ |
| -4 | $(-64)-3(16)-6(-4)+8=-64-48+24+8=-79$ |
| -3 | $(-27)-3(9)-6(-3)+8=-27-27+18+8=-28$ |
| -2 | $(-8)-3(4)-6(-2)+8=-8-12+12+8=0$ |
| -1 | $(-1)-3(1)-6(-1)+8=-1-3+6+8=10$ |
| 0 | $0-0-0+8=8$ |
| 1 | $1-3-6+8=0$ |
| 2 | $8-12-12+8=-8$ |
| 3 | $27-27-18+8=-10$ |
| 4 | $64-48-24+8=0$ |
| 5 | $125-75-30+8=28$ |
## Step2: Identify zero values
Locate rows where the expression equals 0.
# Answer:
The expression has zeros at $x=-2$, $x=1$, and $x=4$.

Sovi.AI - AI Math Tutor

QUESTION IMAGE

Question

Explanation:

Problem 4

Step1: Create table for integer x

Step2: Identify minimum value

Step1: Multiply first binomial pair

Step2: Multiply second binomial pair

Step3: Add and combine like terms

Step1: Choose test x values

Step2: Build verification table

Step3: Confirm equivalence

Answer:

Problem 5 (a)

$x$	$x^2 - 8x + 10$
1	$1^2 -8(1)+10=3$
2	$2^2 -8(2)+10=-2$
3	$3^2 -8(3)+10=-5$
4	$4^2 -8(4)+10=-6$
5	$5^2 -8(5)+10=-5$
6	$6^2 -8(6)+10=-2$
7	$7^2 -8(7)+10=3$
8	$8^2 -8(8)+10=10$
9	$9^2 -8(9)+10=19$
10	$10^2 -8(10)+10=30$

$x$	Original Expression $(x+7)(x+3)+(x-1)(x-4)$	Simplified Expression $2x^2+5x+25$
-1	$(6)(2)+(-2)(-5)=12+10=22$	$2(1)+5(-1)+25=2-5+25=22$
0	$(7)(3)+(-1)(-4)=21+4=25$	$2(0)+5(0)+25=25$
1	$(8)(4)+(0)(-3)=32+0=32$	$2(1)+5(1)+25=2+5+25=32$
2	$(9)(5)+(1)(-2)=45-2=43$	$2(4)+5(2)+25=8+10+25=43$