(a) Interpretation: The number of centimeters and nanometers in 5 pm is to be calculated. Concept introduction: The conversion of one unit into another can be done using a proper conversion factor. Conversion factors are the ratios that relate the two different units of a quantity. It is also known as dimensional analysis or factor label method. In the unit conversion problems, the given information is multiplied by the conversion factors to obtain the desired information. The unit conversion can be done as follows: ( beginning unit ) ( Final unit beginning unit ) = Final unit
(a) Interpretation: The number of centimeters and nanometers in 5 pm is to be calculated. Concept introduction: The conversion of one unit into another can be done using a proper conversion factor. Conversion factors are the ratios that relate the two different units of a quantity. It is also known as dimensional analysis or factor label method. In the unit conversion problems, the given information is multiplied by the conversion factors to obtain the desired information. The unit conversion can be done as follows: ( beginning unit ) ( Final unit beginning unit ) = Final unit
The number of centimeters and nanometers in 5pm is to be calculated.
Concept introduction:
The conversion of one unit into another can be done using a proper conversion factor. Conversion factors are the ratios that relate the two different units of a quantity. It is also known as dimensional analysis or factor label method.
In the unit conversion problems, the given information is multiplied by the conversion factors to obtain the desired information. The unit conversion can be done as follows:
(beginning unit)(Final unitbeginning unit)=Final unit
Interpretation Introduction
(b)
Interpretation:
The number of cubic meters and cubic millimeters in 8.5cm3 is to be calculated.
Concept introduction:
The conversion of one unit into another can be done using a proper conversion factor. Conversion factors are the ratios that relate the two different units of a quantity. It is also known as dimensional analysis or factor label method.
In the unit conversion problems, the given information is multiplied by the conversion factors to obtain the desired information. The unit conversion can be done as follows:
(beginning unit)(Final unitbeginning unit)=Final unit
Interpretation Introduction
(c)
Interpretation:
The number of grams and pictograms in 65.2mg is to be calculated.
Concept introduction:
The conversion of one unit into another can be done using a proper conversion factor. Conversion factors are the ratios that relate the two different units of a quantity. It is also known as dimensional analysis or factor label method.
In the unit conversion problems, the given information is multiplied by the conversion factors to obtain the desired information. The unit conversion can be done as follows:
(beginning unit)(Final unitbeginning unit)=Final unit
Carry out the following conversions.
(a) 5 pm =_________________cm=_______________nm(b) 8.5 cm3 =_______________m3=________________nm3(c) 65.2 mg =______________g=_________________pg
4. Pictured below are volume measurements using graduated cylinders. What is the volume of
liquid shown in graduated cylinders A-D? What is the total volume in graduated cylinder E?
50
50
40
40
40
3C
30
30
30
20
20
10
Rock
(A) 15
ml
(B) 48 mL (C).
mL
(D) 18 mL (E) 41 mL
If the graduated cylinders D and E show the same cylinder before and after the rock
was added, what is the volume of the rock?
mL
[12]
Complete the following conversions between SI units.(a) 612 g = ________ mg(b) 8.160 m = ________ cm(c) 3779 μg = ________ g(d) 781 mL = ________ L(e) 4.18 kg = ________ g(f) 27.8 m = ________ km(g) 0.13 mL = ________ L(h) 1738 km = ________ m(i) 1.9 Gg = ________ g
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Author:Steven D. Gammon, Ebbing, Darrell Ebbing, Steven D., Darrell; Gammon, Darrell Ebbing; Steven D. Gammon, Darrell D.; Gammon, Ebbing; Steven D. Gammon; Darrell
Author:Steven D. Gammon, Ebbing, Darrell Ebbing, Steven D., Darrell; Gammon, Darrell Ebbing; Steven D. Gammon, Darrell D.; Gammon, Ebbing; Steven D. Gammon; Darrell