Math 2000 Solutions 5
Fall 2001
Unit 3B
12. In 1993, cardiovascular diseases caused
7.3986 × 105 deaths. If you multiply 7.3986 by 105 (which
is 100,000), you get 739,860.
26. This exercise asks for an estimate of the
amount of gasoline used by an average adult. Just about any estimate is
acceptable as long as you state your assumptions. For example, you might reason
that an average person uses one tank of gasoline per week. If you assume that
an average tank holds 15 gallons, then you get (note use of units):
This is just an estimate, but it tells us
that a typical amount of gas used in a year is in the hundreds, not the tens or
thousands or millions. Note is also say that the average amount spent on
gasoline (say, $1.50 per gallon) is on the order of $1000.
30. Please use units to make this conversion:
There are about 6027 marriage per day in this
country.
48. The conversion factor for this time line
is 15 billion years = 100 meters, or 1.5 × 1010 years = 102
meters. To convert 1 billion years to meters, we use the conversion factor:
Thus, the point in time 1 billion years ago
is 6.7 meters (about 7 yards) from the end of the field that represents the
present. Converting 10,000 (104 years), we have
The point in time 10,000 years ago is
0.0000667 meters (or 0.067 millimeters) from the end of the field that
represents the present.
Percentage Problems
3a,b. These two problems can be worked
together because they use the same sentence. As discussed in class, the
sentence that describes salary before and after income tax is
After-tax
salary = Before-tax salary - (tax rate) × before-tax
salary.
In other words, income tax is subtracted from
before-tax salary, not added to after-tax salary. In exercise 3a, we have a 20%
tax rate, so the sentence is
After-tax
salary = Before-tax salary - (20% × before-tax salary).
Noting that before-tax salary means 100% of
before-tax salary, we have
After-tax
salary = (100% ×Before-tax salary) - (20% × before-tax salary)
= 80% × before-tax salary.
We are given that after-tax salary is
$34,500, so we have
$34,500 = 80%
× before-tax salary = 0.8 × before-tax salary.
To find before-tax salary, we divide both
sides of the sentence by 0.8 and find that
The after-tax salary is $43,125. You should
check to see if this is correct: if you subtract 20% of $43,125 from $43,125,
you get the after-tax salary $34,500.
For exercise 3b, we use the same sentence
with a 28% tax rate:
After-tax
salary = (100% × before-tax salary) - (28% × before-tax salary).
= 72% × before-tax salary.
Now we are given that the before-tax salary
is $42,500. The after-tax salary can be found directly by multiplication:
After-tax
salary = 0.72 × $42,500 = $30,600.
The after-tax salary is $30,600.
3c. This is a comparison problem and we must
find the relative difference. The wording of the sentence tells us that 1
kilometer is the reference quantity (because it follows than) and 1 mile
is the compared quantity. We have
Noting that 1 mile = 1.61 km, we can write
Thus, 1 mile is 61% greater than 1 kilometer.
3d. Again, the sentence is critical. Because
the stock market increased, the opening and closing values of the stock
market are related by the sentence
Closing
value = opening value + (4.5% of
opening value).
or
Closing =
(100% of opening) + (4.5% of opening) = 104.5% × opening.
We are given that the closing value is 8664.
Thus,
8664 = 104.5%
× opening = 1.045 × opening.
To find the opening value, we divide by 1.045
to find
The market opened at 8291. You should check
that this is correct: A 4.5% increase to 8291 gives 8664.