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Consumer
arithmetic II
Clement Radcliffe, Contributor
Last
week, we reviewed Indices and several points were presented for your information.
I ask that you look carefully at these and then join me in checking the homework.
1.
Simplify the following
1.
(a) 4x³
x 5x²y
x 2xy³
(b) 9x-4y²
÷ 3x³y
-5 Solution
(a)
4x³ x
5x²y x
2xy³ =
4 x 5 x 2 x x3
x
x² x x
x y x y³ As
multiplication of the above involves adding indices: ie.
4x3 x 5x²y
x 2xy³
= 40x6y4 (b)
9x-4y²
÷ 3x³y
-5 = (9 ÷
3) x (x-4
÷ x³)
x (y²
÷ y-5)
As division
of the above involves subtracting of indices: ie.
= 3 x x-4 -3
x y2- -5
= 3x-7y7 2.
Find the values of: (a)
125-2/3
(b)
32-3/5
(c) 811/4 Solution
(a)
Given 125-2/3
we express 125 in terms of base 5. ie.
125-2/3 = (53)-2/3.
In this case, you multiply indices. =
5-2 = 1/25
(b)
32-3/5= (25)-3/5
= 2-3 = 1/8
(c)
811/4 = (34)1/4
= 3¹ =
3 3.
Solve the following equation for x. 92x
= 1/27 Solution
(3²)2x
= 27-1 = (3³)-134x
= 3-? Since
4x and -3 are both powers of
3
then 4x
= -3
x =
-3/4 I
expect that you experienced no difficulty, so we can now proceed to review ratio.
Ratio
If
two values are in the ratio 2:3, then each represents respectively the fraction
of 2/5 and 3/5 of the whole. Proof
In
this case, the whole is taken as 2
+ 3 = 5. ie.
The fractions are 2/5 and 3/5. It
is vital for you to be able to convert ratios to fractions in all cases. Example
A
number is divided in the ratio 3:5. What fraction does the smaller ratio represent?
As the
number is divided into the ratio 3:5, then 3 + 5 = 8 ie.
The fractions are 3/8 and 5/8 ie.
The answer is 3/8 Example
A
sum of money is to be divided among A, B and C in the ratio 2:3:5. The largest
portion amounts to $1200. Calculate:
(a)
The total sum of money to be shared (b)
A's share Since
the money is shared in the ratio 2:3:5 and the whole is represented by 2 + 3 +
5 = 10, the respective portions are as follows: A
= 2/10 or 1/5 B = 3/10 C = 5/10 or 1/2 If
the largest share = $1,200, then this represents C's share which is half of the
total sum. ie.
The total sum is $2,400. A's
share represents 1/5 of the total. This is equal to 1/5 x $2,400 = $480 ie.
A's share is $480 Finally,
we will now review briefly aspects of Approximation. APPROXIMATION
This
topic highlights the various degrees of accuracy to which a value may be expressed.
While counting always gives an accurate assessment, it is measurement which lends
itself to approximation, depending on the nature of the instrument used. For example,
an electronic balance can measure the weight of a sample to three or more decimal
places while this degree of accuracy is not always required. You therefore have
the option of giving a value to the degree of accuracy you require.
The
three methods which are usually used at this level are:
1.
Decimal places
2.
Significant figures
3.
Standard form (1)
Decimal places Numbers
may be expressed correct to a specified number of decimal places as in the case
of the following: Express
46.42806 (i)
Correct to two decimal places.
(ii)
Correct to three decimal places. Solution
(i)
46.43 (Start by looking first at the number which is holding the third place after
the decimal point. It is 8. Since 8 is more then 5, 1 is added to the number 2,
the number which comes two places after the decimal point.) N.B.
If it were 5 instead of 8 holding the third place after the decimal, 1 would also
be added to the number 2. (ii)
46.428 (2)
Significant figure The
degree of accuracy to which a value is required may be determined by the number
of figures in the value. For example, a value expressed correct to two significant
figures may be in the form of 24, 1200km or 0.036 litres. Example
Express
259.163 correct to: (i)
Three significant figures
(ii)
Four significant figures Solution
(i)
259 (The number holding the fourth place is 1, so the 9 remains unchanged.) N.B.
259.0 is INCORRECT (ii)
259.2 (N.B. Since 6 > 5, then 1 is added to the 1 similar to the method above.)
(3)
Standard form This
is a very effective means, especially for very large or very small values. The
standard form is A x 10n, where A is a number 1 and 10 and n, the power of 10
is an integer (positive or negative, whole number, or zero.) Example
Express
3,715,382 in standard form. a)
372 x 106
b)
3.72 x 10-6
c)
3.72 x 106
d) 3.72 x 107 Since
the standard form is A x 10n, using the above definition of A and n, then A is
3.72. It
should be noted that CXC accepts values expressed correct to three significant
figures. The other figures are simply ignored. In
the number 3,715,382, since the decimal place is after the 2, it is then
moved 6 places to the left, to between 3 and 7, consistent with the definition
of A, therefore n = 6. The
standard form is therefore 3.72 x 106.
The answer is (c). HomeWork
1.
An estate valued at $90,000 is divided among three daughters in the ratio 5 :
8 : 2 respectively. Calculate the amount each received. 2.
Find the following numbers correct to two decimal places. a)
3.128
b) 0.055
c)4.999 3.
Divide 41 by 15. Give your answer to three decimal places. 4.
Express the number 105.8054 correct to the number of significant figures stated
below. a)
6
b) 4
c) 2
d)
5
e) 3
f) 1 Clement
Radcliffe is the principal of Glenmuir High School in May Pen. | 
