Unit Conversion Problems

Swimming Distance

1. **State the problem:** Betsy swam 690 meters each day for 2 weeks. We need to find how many kilometers she swam in total. 2. **Identify the formula and conversion:** Total dista

Balloon String

1. **State the problem:** Lonna wants 43 balloons, each with a string 6 feet long. String is sold by the yard, and we need to find how many yards of string she needs. 2. **Given:**

Hours To Minutes

1. **Problem:** Convert 8 1/4 hours to minutes. 2. **Formula:** 1 hour = 60 minutes.

Days To Hours

1. The problem is to convert 20 days into hours and express the result as a ratio. 2. We know the conversion factor: 1 day = 24 hours.

Days To Hours

1. The problem is to convert $d$ days into hours. 2. We know that 1 day equals 24 hours.

Unit Conversion

1. The problem is to convert 170 to meters. 2. We need to clarify the unit of 170 to convert it properly to meters.

Meters To Centimeters

1. **State the problem:** Convert 45 meters to centimeters. 2. **Formula and rules:** We know that 1 meter equals 100 centimeters. So, to convert meters to centimeters, multiply th

Ml To Liters

1. The problem is to convert 475 milliliters (mL) to liters (L). 2. The formula to convert milliliters to liters is:

Decimal Days

1. The problem is to convert 0.55 of a day into hours, minutes, and seconds. 2. We know that 1 day = 24 hours.

Months To Days

1. The problem is to convert 9.55 months into days. 2. We use the average number of days in a month for conversion. Typically, 1 month is approximated as 30.44 days (since a year h

Cm To Inches

1. The problem is to convert 10.5 centimeters (cm) to inches. 2. The formula to convert centimeters to inches is: $$\text{inches} = \frac{\text{cm}}{2.54}$$ because 1 inch equals 2

Meter To Cm

1. The problem is to convert 3 meters to centimeters. 2. The formula to convert meters to centimeters is: $$\text{centimeters} = \text{meters} \times 100$$ because 1 meter equals 1

Area Unit Conversion

1. We are asked to convert the given areas into appropriate units. 2. Recall the unit conversions for area:

Unit Conversions

1. We are asked to convert the given lengths into the requested units. 2. Recall the unit conversion rules:

Mount Everest Height

1. **State the problem:** We need to find how many miles high Mount Everest is, given its height in feet and the conversion factor between feet and miles. 2. **Formula:** To conver

Unit Conversion Length

1. **State the problem:** Convert $3$ dam and $264$ dm into centimeters (cm). 2. **Recall the conversion factors:**

Seconds In Minutes

1. The problem asks: How many seconds are in 7 minutes? 2. We know the conversion factor: 1 minute = 60 seconds.

Volume Reciprocals

1. The problem involves understanding and converting between different volume units and their reciprocals related to length measurements. 2. Recall the basic volume conversions:

Ladder Height

1. The problem asks to convert a ladder height of 69 inches into feet and inches. 2. We use the conversion rule: 1 foot = 12 inches.

Minutes To Seconds

1. The problem is to convert 12 minutes into seconds and then compare it to 20 seconds. 2. We use the conversion formula: $$1 \text{ minute} = 60 \text{ seconds}$$.

Time Conversion

1. Problem: Convert 1 millennium to seconds. Given: 1 millennium = 1000 years