translate each problem into an equation. drawing a sketch may help you.
13. a ribbon 9 feet long is cut into two pieces. one piece is 1 foot longer than the other. what are the lengths of the pieces?
14. the height of a tower is three - times the height of a certain building. if the tower is 50 m taller than the building, how tall is the tower?
15. the length of a rectangle is twice its width. if the perimeter is 48, find the dimensions of the rectangle.
16. the length of a rectangle is one unit more than its width. if the area is 30 square units, find the dimensions of the rectangle.
17. the sides of a triangle have lengths 7, x, and x + 1. if the perimeter is 30, find the value of x.
18. a triangle has two equal sides and a third side that is 15 cm long. if the perimeter is 50 cm, how long is each of the two equal sides?

Question

Accepted Answer

### 13.
# Explanation:
## Step1: Let the lengths of the pieces
Let the length of one piece be $x$ feet and the other be $x + 1$ feet.
## Step2: Set up the equation
The sum of the lengths of the two - pieces is equal to the length of the ribbon. So $x+(x + 1)=9$.
## Step3: Simplify the equation
Combining like - terms, we get $2x+1 = 9$.
## Step4: Solve for $x$
Subtract 1 from both sides: $2x=9 - 1=8$. Then divide both sides by 2: $x = 4$.
## Step5: Find the lengths of the pieces
One piece is $x = 4$ feet and the other is $x + 1=5$ feet.
# Answer:
4 feet and 5 feet

### 14.
# Explanation:
## Step1: Let the height of the building
Let the height of the building be $x$ meters. Then the height of the tower is $3x$ meters.
## Step2: Set up the equation
The tower is 50 meters taller than the building, so $3x=x + 50$.
## Step3: Solve for $x$
Subtract $x$ from both sides: $3x−x=50$, which simplifies to $2x = 50$. Divide both sides by 2: $x = 25$.
## Step4: Find the height of the tower
The height of the tower is $3x$, so $3	imes25 = 75$ meters.
# Answer:
75 meters

### 15.
# Explanation:
## Step1: Let the width of the rectangle
Let the width of the rectangle be $w$. Then the length $l = 2w$.
## Step2: Recall the perimeter formula
The perimeter of a rectangle $P=2(l + w)$. Given $P = 48$.
## Step3: Substitute $l$ into the perimeter formula
$48=2(2w+w)$.
## Step4: Simplify the equation
$48=2	imes3w=6w$.
## Step5: Solve for $w$
Divide both sides by 6: $w = 8$.
## Step6: Find the length
$l = 2w=16$.
# Answer:
Length: 16, Width: 8

### 16.
# Explanation:
## Step1: Let the width of the rectangle
Let the width of the rectangle be $w$. Then the length $l=w + 1$.
## Step2: Recall the area formula
The area of a rectangle $A=l	imes w$. Given $A = 30$.
## Step3: Substitute $l$ into the area formula
$30=(w + 1)	imes w=w^{2}+w$.
## Step4: Rearrange to a quadratic equation
$w^{2}+w−30=0$.
## Step5: Factor the quadratic equation
$(w + 6)(w - 5)=0$.
## Step6: Solve for $w$
$w=-6$ or $w = 5$. Since width cannot be negative, $w = 5$.
## Step7: Find the length
$l=w + 1=6$.
# Answer:
Length: 6, Width: 5

### 17.
# Explanation:
## Step1: Recall the perimeter formula for a triangle
The perimeter of a triangle $P=a + b + c$. Here, $P = 30$, $a = 7$, $b=x$, $c=x + 1$.
## Step2: Set up the equation
$30=7+x+(x + 1)$.
## Step3: Simplify the equation
$30=7+x+x + 1=8 + 2x$.
## Step4: Solve for $x$
Subtract 8 from both sides: $2x=30 - 8=22$. Divide both sides by 2: $x = 11$.
# Answer:
11

### 18.
# Explanation:
## Step1: Let the length of each of the equal sides
Let the length of each of the equal sides be $x$ cm.
## Step2: Recall the perimeter formula for a triangle
The perimeter of a triangle $P=a + b + c$. Here, $P = 50$, $a=x$, $b=x$, $c = 15$.
## Step3: Set up the equation
$50=x+x + 15$.
## Step4: Simplify the equation
$50=2x+15$.
## Step5: Solve for $x$
Subtract 15 from both sides: $2x=50 - 15=35$. Divide both sides by 2: $x = 17.5$.
# Answer:
17.5 cm

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QUESTION IMAGE

Question

Explanation:

13.

Step1: Let the lengths of the pieces

Step2: Set up the equation

Step3: Simplify the equation

Step4: Solve for $x$

Step5: Find the lengths of the pieces

Step1: Let the height of the building

Step2: Set up the equation

Step3: Solve for $x$

Step4: Find the height of the tower

Step1: Let the width of the rectangle

Step2: Recall the perimeter formula

Step3: Substitute $l$ into the perimeter formula

Step4: Simplify the equation

Step5: Solve for $w$

Step6: Find the length

Answer:

14.