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Q: WHO DOES THE COLLATERAL DUTY SAFETY OFFICER (CDSO) REPORT TO?
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What publication requires the Collateral Duty Safety Officer (CDSO) to maintain safety survey and inspection reports for a minimum of one year?

AR 385-10


What determines the class of an accident?

The class of an army accident is determined by the cost and amount of injury. Check out this link to find out more about the army's classes of accident: http://www.wainwright.army.mil/safety/CDSO%20Documents/AGAR%20PACKET/accident%20classification.pdf


What determine the class of accident?

The class of an army accident is determined by the cost and amount of injury. Check out this link to find out more about the army's classes of accident: http://www.wainwright.army.mil/safety/CDSO%20Documents/AGAR%20PACKET/accident%20classification.pdf


What determine the class of an army accident?

The class of an army accident is determined by the cost and amount of injury. Check out this link to find out more about the army's classes of accident: http://www.wainwright.army.mil/safety/CDSO%20Documents/AGAR%20PACKET/accident%20classification.pdf


What is a two term ratio?

We may speak of two term and three or more term ratios. There is a big difference. Two term ratios may be identified with fractions. That identification may justify (I am not a historian and try to refrain from making remarks on the history of ideas in mathematics) calling unsigned and then signed fractions, rational numbers.In the discussion of maps, scale factor (the relation between actual distance and distance on the map) may be expressed as a ratio or fraction.Two term ratios may be called binary ratios.What is a two term ratio?We read and declare A:B as the ratio A to B. We say one ratio A:B is the same as another ratio C:D when and only when the cross products AD = BC. Equality of two-term ratiosWe write A:B :: C:D when and only when AD = CD and read A:B :: C:D as the ratio A:C and C:D are equal. We could use the equal sign = in place of the old fashioned four dot symbol ::. Convention: The ratio notation A:B appears when and only when the scaling properties of the first and second term are important.Two Term Ratios and FractionsNow the equality condition for ratios AD = BC holds when and only whenAD BD=BCBDwhich in turn holds when and when onlyAB=CDSo two ratios A:B and C:D are equal or equivalent when and only when the corresponding fractions (or compound fractions)ABandCDare equal or equivalent. So equality of two term ratios A:B and C:D may be cast as a comparision of fractionsABandCDDue to this correspondence, fractions where the numerators and denominators are both whole numbers are also called ratios.Rational numbers may be thought of as fractions whose numerators and denominators are provided by integers instead of whole numbers.Identification of Fractions and Binary (two-term) RatiosIn many places around the world, the fractionABis called a ratio, and no difference is emphasized between the concept of a ratio A:B and the concept of a fraction. Even I will call a fraction a ratio, or vice-versa. Reasoning involving equivalent ratios written as A:B can also be done with equivalent fractions written asABProportionality of Numerators and Denominators Or the first and second term in a ratioDirect Proportionality: A number or quantity Z is directly proportional to another quantity X in several circumstances when and only when the quotient Z ÷ X = Z/X has a constant value k,.or equivalently, there is a constant k such that Z = k X. That is in each instance where we find or measure the value of X, the value of Z will be kX.Fractions and Ratios scale in the same way. Therefore A:B = M:N when and only whenMN=ABare equal when and only when the first term M of the ratio M:NM=[AB]N=kNis proportional to the second term N in the ratio M:NMore on the Identification:Earlier writers identify a ratio m: n (read m to n) of a pair of numbers with the fraction mnThat makes sense when considering m parts of equal value out of n parts of equal value. With this identification two ratios a:b and c:d are equal when and only when the corresponding fractions are equivalentab=cd(1)or have equal values. Here a and d are called the extremes of the ratio;Therefore a:b = c:d implies c:d = a:b. Therefore a:b = c:d implies b:a = c:d (extremes swapped with means) and d:c = b:a as reciprocals of both sides in (1) must be equal.Algebraic forward and backward views of the latter equation implies the following when two ratios a:b and c:d are equal.ad=cb(2)clear denominators in (1) by multiplying by bd. So product of extremes a and d equals the product of meansac=bd(3)introduce denominators in (3) by dividing by cd. Soa:c = b:d. Swapping the means preserves equality.db=ca(3)introduce denominators in (2) by dividing by ba. Sod:c = b:a Swapping the extremes preserves equality.More on Scaling Ratios or raising termsFrom the equivalent fraction raising terms property thatAB=nAnBwe observe A: B = nA : nB when ever the first and second terms in a ratio A:B are multiplied by the same whole number n.Compound fractions have a similar property:AB=qAqBwhenever q is a fraction (or real number). So A: B = qA : qB when ever the first and second terms in a ratio A:B are multiplied by the same fraction or real number q.Differences between fractions A/B and ratios A:BWe can add, subtract, multiply and divide fractions written asA BBut these arithmetic operations are not (to the best of my knowledge) defined for the ratios written as A:B.We may also identify a fraction written asABwith a percentage or real numberRatios of a part to the whole -YESImagine a collection of q = m + n objects divided into disjoint subsets of m and n objects, respectively. Here the identification of the ratio m:q with the fraction mqcorrectly gives the part as a fraction of the whole.Ratios of complementary parts - Problematic, Food for thoughtImagine a collection of q = m + n objects divided into disjoint subsets of m and n objects, respectively. Here the identification of the ratio m:n with the fraction mnis problematic. The ratio may be identified, if we must, with the compound fractionmm+nmm+nAll this is to suggest that a distinction or nuance exists between the ratio written as m:n and the fraction m/n. The question is how. The ratio notation does not distinguish between the ratio of a part to a whole and the ratio of complimentary parts.