For all values of a, b, c, and d which of the following is equivalent to `((ad)/(bc))/((ac)/(bd))?`
A
`a^(2)c^(2)`
B
`(a^(2))/(h^(2))`
C
`(d^(2))/(c^(2))`
D
`b^(2)d^(2)`
Text Solution
Verified by Experts
The correct Answer is:
C
Topper's Solved these Questions
STRATEGIES
PRINCETON|Exercise QUICK QUIZ #3|6 Videos
STRATEGIES
PRINCETON|Exercise QUICK QUIZ #4|1 Videos
STRATEGIES
PRINCETON|Exercise QUICK QUIZ #1|4 Videos
SAT MATH: THE BIG PICTURE
PRINCETON|Exercise Example|4 Videos
Similar Questions
Explore conceptually related problems
Which of the following is equivalent to (2b^(3)c^(2)+b^(2)c)-(b^(3)c^(2)-b^(2)c-4bc) ?
If a, b and c are in H.P., then the value of ((ac+ab-bc)(ab+bc-ac))/(abc)^2 is
Prove that the points (a, b), (c, d) and (a-c, b-d) are collinear, if ad = bc.
If the four consecutive coefficients in any binomial expansion be a,b,c and d then (A) (a+b)/a,(b+c)/b,(c+d)/c are in H.P. (B) (bc+ad)(b-c)=2(ac^2-b^2d) (C) b/a,c/b,d/c are in A.P. (D) none of these
If the four consecutive coefficients in any binomial expansion be a, b, c, d, then prove that (i) (a+b)/a , (b+c)/b , (c+d)/c are in H.P. (ii) (bc + ad) (b-c) = 2(ac^2 - b^2d)
If the four consecutive coefficients in any binomial expansion be a, b, c, d, then prove that (i) (a+b)/a , (b+c)/b , (c+d)/c are in H.P. (ii) (bc + ad) (b-c) = 2(ac^2 - b^2d)
Q. If a, b,c and d are distinct positive no. in AP. then (A) ad lt bc (B) a+c lt b+d (c) a+d=2(b+c) (D) a+d=3(b+c)
D and E are respectively the points on the sides AB and AC of a triangle ABC such that AD = 2cm, BD = 3 cm, BC = 7.5 cm and DE |\ | BC. Then, length of DE (in cm) is (a) 2.5 (b) 3 (c) 5 (d) 6
If a=10, b=4, c=6, d=9, find :- (i) (ad)/(bc) (ii) ad xx bc
