UCAT Exam  >  UCAT Notes  >  Quantitative Reasoning for UCAT  >  Rates and Conversions

Rates and Conversions | Quantitative Reasoning for UCAT PDF Download

Rate

  • A rate is a ratio that compares two quantities with different units.
  • It expresses how one quantity changes in relation to another quantity

Example: speed is a rate that compares distance and time (e.g., miles per hour or kilometers per hour).

Rate Calculation:
To calculate a rate, divide the quantity of interest by the unit of measurement.
Rate = Quantity of Interest / Unit of Measurement

Types of Rates


1. Speed Rate:
Speed rate measures the distance traveled per unit of time.

Example: If a car travels 200 kilometers in 4 hours, the speed rate is 200 km/4 hours = 50 km/h.

2. Growth Rate:
Growth rate measures the change in a quantity over time.

Example: If a population increases from 1000 to 1500 in 5 years, the growth rate is (1500 - 1000) / 5 = 100 people per year.

3.Interest Rate:
Interest rate measures the cost or return on an investment over a specific period.

Example: If $1000 invested in a savings account earns $50 in interest in one year, the interest rate is $50/$1000 = 5%.

Conversions


Conversions involve changing units or quantities from one form to another. In the UCAT exam, you may need to convert units of length, weight, volume, time, and currency.

Common Unit Conversions:
Length:

  • 1 meter (m) = 100 centimeters (cm)
  • 1 meter (m) = 1000 millimeters (mm)
  •  1 inch = 2.54 cm

Mass:

  • 1 kilogram (kg) = 1000 grams (g)
  • 1 kilogram (kg) = 1000000 milligrams (mg)
  • 1 pound = 0.4536 kg.

Time:

  • 1 hour (h) = 60 minutes (min)
  • 1 hour (h) = 3600 seconds (s)

Volume:

  • 1 liter (L) = 1000 milliliters (mL)
  • 1 liter (L) = 1000 cubic centimeters (cm³)

Time, Distance and Speed:

  • To convert from km / hour to m / sec, we multiply by 5 / 18. So, 1 km / hour = 5 / 18 m / sec
  • To convert from m / sec to km / hour, we multiply by 18 / 5. So, 1 m / sec = 18 / 5 km / hour = 3.6 km / hour

Similarly, 1 km/hr = 5/8 miles/hour

  • 1 yard = 3 feet
  • 1 kilometer= 1000 meters = 0.6214 mile
  • 1 mile= 1.609 kilometer
  • 1 hour= 60 minutes= 60*60 seconds= 3600 seconds
  • 1 mile = 1760 yards
  • 1 yard = 3 feet
  • 1 mile = 5280 feet
  • 1 mph = (1 x 1760) / (1 x 3600) = 22/45 yards/sec
  • 1 mph = (1 x 5280) / (1 x 3600) = 22/15 ft/sec

Currency Conversions


Definition: The process of converting one currency to another
Importance: Useful for international travel, trading, and commerce

Basics of Currency Conversions

  • Exchange rates: The value of one currency expressed in terms of another
    For example, 1 USD = 0.85 EUR (1 US Dollar is equivalent to 0.85 Euros)
  • Direct and indirect quotes: Two ways of expressing exchange rates
  • Direct quote: Home currency per unit of foreign currency
    Example: 1 EUR = 1.18 USD (1 Euro is equivalent to 1.18 US Dollars)
  • Indirect quote: Foreign currency per unit of home currency
    Example: 1 USD = 0.85 EUR (1 US Dollar is equivalent to 0.85 Euros)

Performing Currency Conversions

  • Simple conversion: Converting a given amount of one currency to another using the exchange rate
    Example: Convert 100 USD to EUR using the exchange rate 1 USD = 0.85 EUR
     Calculation: 100 USD * 0.85 EUR/USD = 85 EUR
  • Cross rates: Exchange rates between two currencies not involving the home currency
    Example: Find the exchange rate between GBP (British Pounds) and EUR (Euros) using the exchange rates 1 USD = 0.85 EUR and 1 USD = 0.75 GBP
    Calculation: (1 EUR/USD) * (0.75 GBP/USD) = 0.64 GBP/EUR
  • Reverse conversions: Converting from foreign currency to home currency
    Example: Convert 100 EUR to USD using the exchange rate 1 EUR = 1.18 USD
    Calculation: 100 EUR * 1.18 USD/EUR = 118 USD

Practice Problems


Q.1. In a business, if A can earn $7500 in 2.5 years, find the unit rate of his earning per month.

Given : Earning in 2.5 years = $7500
1 year = 12 months
2.5 years = 2.5(12) = 30 months
Then, earning in 30 months = $7500
Therefore, earning in 1 month = 7500/30
= $250


Q. 3. If John can cover 360 miles in 3 hours, find the number of miles covered by John in 1 minute.

No of miles covered in 3 hours = 360
Then, no. of miles covered in 1 hour = 360/3 = 120
1 hour = 60 minutes
So, no. of miles covered in 60 minutes = 120
Then, no. of miles covered 1 minute = 120/60
= 2 miles


Q.3. In 36.5 weeks, Miguel raised $2,372.50 for cancer research. How was his unit rate in price per week ?

Given : Miguel raised $2, 372.50 in 36.5 weeks
Then, amount raised in one week = (2372.5)/36.5
= $65


Q.4. If a person drinks 8 cups of apple juice per month, how many gallons will he drink in one year?

Given : 8 cups in one month
1 year = 12 months
So, no. of cups in 1 year = 8(12) = 96 cups
1 gallon = 16 cups
Therefore, no. of gallons in 1 year = 96/16
= 6 gallons


Q.5. 75 basketballs cost $1,143.75. Find the unit rate in price per basketball.

Given : 75 basketballs cost $1,143.75
Then, price of one basket ball = (1143.75)/75
= $15.25

The document Rates and Conversions | Quantitative Reasoning for UCAT is a part of the UCAT Course Quantitative Reasoning for UCAT.
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