Unit #3 - Basic Clinical Laboratory Math

Unit #3 - Basic Clinical Laboratory Math
Author: Cecile Sanders, M.Ed., MLS(ASCP), Revised 11/03/2016

Metric System Most countries use the metric system for measurement
Examples: Gasoline by liter Body weight in kilograms Distance in meters or kilometers U.S. uses English system of measurement in everyday life Gasoline in gallons Weight in pounds Distance in miles

Metric System English system of measurement is not accurate enough for most scientific measurements Because metric system is a decimal system, it can be used for very small quantities with accuracy International System of Units (SI) is a form of the metric system adopted for use by the worldwide scientific community.

Units of Metric System Base Units
Distance = meter (m) Mass or Weight = gram (g) Volume = liter (L) Prefixes are used to indicate larger or smaller quantities of the base units above

Common Metric Prefixes
Kilo (k) = 1000 x base unit Centi (c) = .01 x base unit Milli (m) = .001 x base unit Micro (µ) = x base unit Nano (n) = x base unit Pico (p) = x base unit

Converting within Metric System
Move decimal to left Move decimal to right King Henry Dances BOLDLY Down Center Main * * Micro (kilo)(hecto)(deca) BASE (deci) (centi) (milli)* * (micro) Example: Convert Kilograms to Grams: Move decimal 3 places to right Convert Centimeters to Meters: Move decimal 2 places to left

Converting between English and Metric Systems
Mile x 1.6 = kilometers Pound x = kilograms Quart x 0.95 = liters Kilometer x 0.6 = miles Meter x 3.3 = feet Meter x = inches Centimeter x 0.4 = inches Gram x = pounds Liter x 1.06 = quarts

SI System (International System)
Base Units of the SI System Length = Meter (m) Mass = Kilogram (kg) Time = Second (s) Amount of Substance = Mole (mol) Electric Current = Ampere (A) Temperature = Kelvin (K)* Luminous Intensity = Candela (cd) Volume = Liter (L)** *Although Kelvin is the SI unit, Celsius (C) is used almost exclusively in the clinical laboratory. **Liter (L) was not included in the list of base units in the SI system because the liter is a unit derived from other units. However, the liter has been accepted for use in measuring volume.

All units in the SI system can be qualified by standard prefixes (as shown on slide #5) that serve to convert values to more convenient forms, depending on the size of the object being measured. Commas are not used as spacers in recording large numbers; instead, groups of three digits are separated by spaces.

Non-SI units accepted in the clinical laboratory Minutes (min) Hours (hr) Days (d) Liter (L) Pressure (mm Hg) Enzyme Activity (IU) – International Unit

Temperature Conversion
To convert from Fahrenheit to Centigrade: C0 = 5/9(F0-32) To convert from Centigrade to Fahrenheit: F0 = 9/5(C0) + 32

Dilutions for the Clinical Laboratory
Dilution = making weaker solutions from stronger ones Example: Making orange juice from frozen concentrate. You mix one can of frozen orange juice with three (3) cans of water.

Dilutions for the Clinical Laboratory (cont’d)
Dilutions are expressed as the volume of the solution being diluted per the total final volume of the dilution In the orange juice example on the previous slide, the dilution would be expressed as 1/4, for one can of O.J. to a TOTAL of four cans of diluted O.J. When saying the dilution, you would say, in the O.J. example: “one in four”.

Another example: If you dilute 1 ml of serum with 9 ml of saline, the dilution would be written 1/10 or said “one in ten”, because you express the volume of the solution being diluted (1 ml of serum) per the TOTAL final volume of the dilution (10 ml total).

Another example: One (1) part of concentrated acid is diluted with 100 parts of water. The total solution volume is 101 parts (1 part acid parts water). The dilution is written as 1/101 or said “one in one hundred and one”.

Notice that dilutions do NOT have units (cans, ml, or parts) but are expressed as one number to another number Example: 1/10 or “one in ten”

Dilutions are always expressed with the original substance diluted as one (1). If more than one part of original substance is initially used, it is necessary to convert the original substance part to one (1) when the dilution is expressed.

Example: Two (2) parts of dye are diluted with eight (8) parts of diluent (the term often used for the diluting solution). The total solution volume is 10 parts (2 parts dye + 8 parts diluent). The dilution is initially expressed as 2/10, but the original substance must be expressed as one (1). To get the original volume to one (1), use a ratio and proportion equation, remembering that dilutions are stated in terms of 1 to something: ______2 parts dye = ___1.0___ 10 parts total volume x 2 x = x = The dilution is expressed as 1/5.

The dilution does not always end up in whole numbers. Example: Two parts (2) parts of whole blood are diluted with five (5) parts of saline. The total solution volume is seven (7) parts (2 parts of whole blood + 5 parts saline). The dilution would be 2/7, or, more correctly, 1/3.5. Again, this is calculated by using the ratio and proportion equation, remembering that dilutions are stated in terms of 1 to something: __2 parts blood_____ = ___1.0___ 7 parts total volume x 2 x = x = The dilution is expressed as 1/3.5

Dilution Factor – used to correct for having used a diluted sample in a lab test rather than the undiluted sample. The result (answer) using the diluted sample must be multiplied by the RECIPROCAL of the dilution made. The RECIPROCAL of a 1/5 dilution is 5.

Correction for using a diluted sample Example: A technician performed a laboratory analysis of patient’s serum for a serum glucose (blood sugar) determination. The patient’s serum glucose was too high to read on the glucose instrument. The technician diluted the patient’s serum 1/2 and re-ran the diluted specimen, obtaining a result of 210 g/dl. To correct for the dilution, it is necessary to multiply the result by the dilution factor (in this case x 2). The final result is 210 g/dl x 2 = 420 g/dl.

Sometimes it is necessary to make a dilution of an existing solution to make it weaker. Example: A 100 mg/dl solution of substrate is needed for a laboratory procedure. All that is available is a 500 mg/dl solution of substrate. A dilution of the stronger solution of substrate is needed.

To make a weaker solution from a stronger one, use this formula: V1 x C1 = V2 x C2 Example: To make 100 ml of the 100 mg/dl solution from the 500 mg/dl solution needed in the previous example: V1 = 100 ml V2 = V2 (unknown) C1 = 100 mg/dl C2 = 500 mg/dl 100 ml x 100 mg/dl = V2 x 500 mg/dl V2 = 20 ml Dilute 20 ml of 500 mg/dl solution up to 100 ml with water to obtain 100 ml of 100 mg/dl substrate solution

Serial Dilutions Dilutions can be made singly (as shown previously) or in series, in which case the original dilution is diluted further. A general rule for calculating the dilution of solutions obtained by diluting in a series is to MULTIPLY the original dilution by subsequent dilutions.

Serial Dilutions (cont’d)
Example of a serial dilution:

In the serial dilution on the previous slide, 1 ml of stock solution is mixed with 9 ml of diluent, for a 1/10 dilution. Then 1 ml of the 1/10 dilution is mixed with another 9 ml of diluent. The second tube also has a 1/10 dilution, but the concentration of stock in the second tube is 1/10 x 1/10 for a 1/100 dilution.

Continuing with the serial dilution, in the third tube, you mix 1 ml of the 1/100 dilution from the second tube with 9 ml of diluent in the third tube. Again you have a 1/10 dilution in the third tube, but the concentration of stock in the third tube is 1/10 x 1/10 x 1/10 for a 1/1000 dilution. This dilution could be carried out over many subsequent tubes.

Serial dilutions are most often used in serological procedures, where technicians need to make dilutions of patient’s serum to determine the weakest concentration that still exhibits a reaction of some type. The RECIPROCAL of the weakest concentration exhibiting a reaction is called a “titer”.

Example of determining a titer: A technician makes a serial dilution using patient serum: Tube #1 = 1/10 Tube #2 = 1/100 Tube #3 = 1/1000 Tube #4 = 1/10,000 Tube #5 = 1/100,000 Reactions occur in tubes 1 through 3, but NOT in tubes 4 or 5. The titer = 1000.

Rounding Off Numbers Sometimes it is necessary to round off insignificant digits in order not to imply an accuracy greater than the test is capable of delivering. When the digit next to the last one to be retained is less than 5, the last digit should be left unchanged. Example: is rounded off to 7.86

Rounding Off Numbers (cont’d)
When the digit next to the last one to be retained is greater than 5, the last digit is increased by 1. Example: is rounded off to 7.867 If the additional digit is 5, the last digit reported is changed to the nearest even number. Example: is rounded off to 23.2 Example: is rounded off to 23.4

Basic Clinical Laboratory Math Assignment
The assignment for this Clinical Laboratory Math unit is found in the “Assignments” folder at the bottom of the menu. All instructional material may be used for this assignment. Please complete it by the deadline listed on the Schedule. As always, for help, or call or

Basic Clinical Laboratory Math
Resources Mathematics for the Clinical Laboratory, Doucette, L. J., Saunders, Third Edition, 2016 Essential Laboratory Mathematics, Johnson, Timmons, and Hall, Waveland Press, Second Edition, 2010

Unit #3 - Basic Clinical Laboratory Math

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