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antecedents; B and D are the consequents; A and Dare the extremes; and B and Care the means.

The antecedents are called homologous or like terms, and so also are the consequents.

97. All the terms of a proportion are called Proportionals; and the last term is called a fourth proportional to the other three taken in their order.

Thus, in the proportion A: B :: C :D, D is the fourth proportional to A, B, and C.

98. When both the means are the same magnitude, either of them is called a mean proportional between the extremes; and if, in a series of proportional magnitudes, each consequent is the same as the next antecedent, those magnitudes are said to be in continued proportion.

Thus, if we have A : B ::B:C::C:D :: D : E, B is a mean proportional between A and C, C between B and D, D between C and E; and the magnitudes A, B, C, D, E are said to be in continued proportion.

99. When a continued proportion consists of but three terms, the middle term is said to be a mean proportional between the other two; and the last term is said to be the third proportional to the first and second.

Thus, when A, B, and Care in proportion, A : B : : B : C; in which case B is called a mean proportional between A and C; and C is called the third proportional to A and B.

100. Magnitudes are in proportion by Inversion, or inversely, when each antecedent takes the place of its consequent, and each consequent the place of its antecedent. Thus, let A: B::C:D; then, by inversion,

B:A::D : C.

101. Magnitudes are in proportion by Alternation, or alternately, when antecedent is compared with antecedent, and consequent with consequent.

Thus, let A: B :: D: C; then, by alternation,

A:D:B : С.

102. Magnitudes are in proportion by Composition, when the sum of the first antecedent and consequent is to the first antecedent, or consequent, as the sum of the second antecedent and consequent is to the second antecedent, or consequent. Thus, let A: B::C: D; then, by composition, A+B : A::C+D : C, or A + B : B : : C + D : D. 103. Magnitudes are in proportion by Division, when the difference of the first antecedent and consequent is to the first antecedent, or consequent, as the difference of the second antecedent and consequent is to the second antecedent, or consequent.

Thus, let A: B::C: D; then, by division, A-B:A::C-D: C, or A-B : B : : C— D : D.

THEOREM І.

104. If four magnitudes are in proportion, the product of the two extremes is equal to the product of the two

means.

Let A : B :: C: D; then will A × D = B × C.

For, since the magnitudes are in proportion,

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and reducing the fractions of this equation to a common denominator, we have

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105. If the product of two magnitudes is equal to the product of two others, these four magnitudes form a proportion.

Let A X D = BXC; then will A : B :: C: D. For, dividing each member of the given equation by BXD, we have

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106. If the product of any two quantities is equal to the square of a third, the third is a mean proportional between the other two.

Let A × C = B2; then B is a mean proportional between A and C.

For, dividing each member of the given equation by BXC, we have

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107. If four magnitudes are in proportion, they will be

in proportion when taken inversely.

Let A: B::C:D; then will B: A : : D : C.

For, from the given proportion, by Theo. I., we have

AXD=BXC, or B × C = A × D.

Hence, by Theo. II.,

B:A::D : C.

THEOREM V.

108. If four magnitudes are in proportion, they will be

in proportion when taken alternately.

Let A: B::C: D; then will A:C:: B : D.
For, since the magnitudes are in proportion,

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109. If four magnitudes are in proportion, they will be in proportion by composition.

Let A: B :: C: D; then will A + B : A : : C + D : С. For, from the given proportion, by Theo. I., we have

BXC=A X D.

Adding A X C to each side of this equation, we have
AXC+B×C=AxC+ A × D,

and resolving each member into its factors,

(A + B) x C = (C+ D) × A.

Hence, by Theo. II.,

A+B : A :: C + D : C.

THEOREM VII.

110. If four magnitudes are in proportion, they will be in proportion by division.

Let A: B::C: D; then will A - B : A : : C-D : C. For, from the given proportion, by Theo. I., we have

BXC=AX D.

:

Subtracting each side of this equation from AXC, we

have

AXC-BXC = A × C— A × D,

and resolving each member into its factors,

(A - B) × C = (CD) × A.

Hence, by Theo. II.,

A-B:A : : C - D : С.

THEOREM VIII.

111. Equimultiples of two magnitudes have the same ratio as the magnitudes themselves.

Let A and B be two magnitudes, and mXA and m×B their equimultiples, then will m✕A:mXB : : A : B. For AXB=B X А.

Multiplying each side of this equation by any number, m, we have

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112. Magnitudes which are proportional to the same

proportionals, will be proportional to each other.

Let A : B :: E: F, and C :D :: E : F; then will

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