Respuesta :
Answer:
For a: The answer is [tex]2.3\times 10^1[/tex]
For b: The answer is [tex]8.0\times 10^{-6}[/tex]
For c: The answer is 127.6
For d: The answer is [tex]4.66\times 10^4[/tex]
Step-by-step explanation:
Significant figures are defined as the figures in a number which express the value -the magnitude of a quantity to a specific degree of accuracy is known as significant digits.
Rules for significant figures:
- Digits from 1 to 9 are always significant and have infinite number of significant figures.
- All non-zero numbers are always significant. For example: 654, 6.54 and 65.4 all have three significant figures.
- All zero’s between integers are always significant. For example: 5005, 5.005 and 50.05 all have four significant figures.
- All zero’s preceding the first integers are never significant. For example: 0.0078 has two significant figures.
- All zero’s after the decimal point are always significant. For example: 4.500, 45.00 and 450.0 all have four significant figures.
- All zeroes used solely for spacing the decimal point are not significant. For example : 8000 has one significant figure.
Rule applied for the addition and subtraction is:
The least precise number present after the decimal point determines the number of significant figures in the answer.
Rule applied for the multiplication and division is:
The number of significant digits is taken from the value which has least precise significant digits.
For the given options:
- Option a: (2.7)(8.632)
The given problem is a multiplication one.
[tex]\Rightarrow (2.7\times 8.632)=23.3[/tex]
Here, the least precise significant digits are 2. So, the answer is [tex]2.3\times 10^1[/tex]
- Option b: (3.600 x 10^-4) / 45
The given problem is a division one.
[tex]\Rightarrow \frac{(3.600\times 10^{-4})}{45}=0.08\times 10^{-4}[/tex]
Here, the least precise significant digits are 2. So, the answer is [tex]8.0\times 10^{-6}[/tex]
- Option c: 2.365 + 125.2
The given problem is an addition one.
[tex]\Rightarrow (2.365+125.2)=127.565[/tex]
Here, the least precise significant digits after decimal is 1. So, the answer is 127.6
- Option d: (4.753 x 10^4) - (9 x 10^2)
The given problem is a subtraction one.
[tex]\Rightarrow (4.753\times 10^4)-(9\times 10^2)=(4.753\times 10^4)-(0.09\times 10^4)=4.663\times 10^4[/tex]
Here, the least precise significant digits after decimal are 2. So, the answer is [tex]4.66\times 10^4[/tex]
