Statements A and C both capture the cross-multiplication property of equal ratios in a proportion. Statement B is a direct algebraic consequence of A when all terms are non-zero. Statement D is correct because multiplying or dividing each term by the same non-zero factor leaves the ratio unchanged. Statement E is false, since if a:b = 2:3, then b:a should be 3:2, not 3:4. Therefore, A, B, C and D only form the correct set, which is option D.
Option A:
Option A is incomplete as it has only A, B and C and omits D, thereby ignoring the important rule about scaling ratios, which is frequently used in simplifying or comparing them.
Option B:
Option B is incorrect because it omits B (true) and so fails to include the fraction form a/c = b/d implied by a:b = c:d.
Option C:
Option C is incomplete since it excludes A; without stating ad = bc explicitly, the key proportionality check is missing even though some other statements are true.
Option D:
Option D is correct because it gathers all the fundamental properties of proportions and ratio scaling while excluding E, which misstates the inverse ratio of 2:3.
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