Sunday, January 29, 2023

MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS

MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS

MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS
Sunday, January 29, 2023

MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS

MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS





MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS

APPROXIMATIONS

Is the process of rounding off a number in the given places in rounding makes numbers easier to deal with but at the same time reduces their accuracy.

The methods used for approximation or rounding off numbers are decimal places and significant figures.

ROUNDING OFF PROCEDURES

i) If the first neglected digit is greater or equal to 5 the digit occupying the place value will increase by 1 unit
ii) If the first neglectednumberis less than five, then the number occupying the required place value will remain unchanged.




ROUNDING OFF NUMBERS

Examples

Round off the followingnumbers to the nearest wholenumber.
a) 3425
b) 7.283
c) 6.674
d) 0.625
e) 36.12
f) 5446

Solutions

a) 3425≈ 3000
b) 7.283≈7
c) 6.674≈7
d) 0.625≈1
e) 36.12≈36
f) 5446≈5000

Round off the following to
a) 1 decimal place.
b) 2 decimal places.
c) 3 decimal places.
a) 23.7016
b) 0.0094

Solution

23.7016≈23.7 to 1 decimal place.
23.7016≈23.70 to 2 decimal place.
23.7016≈23.702 to 3 decimal places.
b) 0.0094
a) 0.0094≈0.0 to 1 decimal place.
b) 0.0094≈0.001 to 2 decimal place.
c) 0.0094≈0.009 to 3 decimal places.

Round off the followingnumberto the nearest
a) Wholenumber
b) Tenth
c) Hundredth
0.625
8.385

Solution

0.625
a) 0.625≈1 to wholenumbers
b) 0.625≈0.6 to tenth
c) 0.625≈0.63 to hundredths
8.385
a) 8.385≈8 to wholenumbers
b) 8.385≈8.4 to tenth
c) 8.385≈ 8.39 to hundredths




Example: Round off 84678 to

i) Tens

Solution

84678 = 84700

ii) Hundreds

Solution

84678 = 85000

iii) Thousands

Solution

84678 = 80000

Example: Round off 179999 correct to i) hundreds ii) Thousand iii) Tens iv )Ten thousands

Solution

i) 179999180000
ii) 180000

iii) 180000

iv) 180000

Significant Figures

The are the total number of digits in the given number including zero’s which are in between non-zero digits.


Note

i) Zero is a significant figure when is inbetweentwo non – zero digits
ii) When zero is an outcome of approximation (rounding off) where a 9 receives landbecomes ten, then zero of ten is a significant figure.

Examples: determine the number of significant figures in the following

i) 20896100

= There are six significant figures

ii) 0.00025060

= There are four significant figures

iii) 2.00008453

= There are nine significant figures




Examples: Re write following numbers correcting to the required of significant figures.

0.23678 to 3 significant figures

Solution

0.23678

∴= 0.24

2.09478 to 3 significant figures

Solution

2.09478

∴= 2.09

0.009994 to 2 significant figures

Solution

0.009994

∴= 0.010

0.00931225697 to 7significant figures

Solutions

0.00931225697

∴= 0.0093123




Exercise

Re write the following numbers correctly to

10.999009 to three significant figures

Solution

10.999009

∴= 11.0

705.4005 to six significant figures

Solution

705.4005

= 705.401

847910 to three significant figures

Solution

847910

∴= 848000

Approximations in operations

When you want to check approximation whether a calculation is correct or not. Round each number in the calculation to 1 significant figure. Do the calculation mentally.


Example:
A group of 42 people go to the cinema, which cost 680/- each. What is the approximation total cost?


Solution


Round 42 to 40 and 680 to 700
Therefore 40 x 700 = 28,000/=
Note: The exact cost is 28,560 The approximation is 28,000 which is close.



MATHEMATICS FORM ONE TOPIC 5-APPROXIMATIONS
4/ 5
Oleh

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