(i) p: Each radius of a circle is a chord of the circle. |
(ii) q: The centre of a circle bisects each chord of the circle |
(iii) r: Circle is a particular case of an ellipse. |
(iv) s: If x and y are integers such that x > y, then \[-x<-y\]. |
(v) \[t:\sqrt{11}\] a rational number. |
A) FFTTF
B) FFTFF
C) TTFFT
D) TFTFF
Correct Answer: A
Solution :
(i) False. By definition of the chord, it should intersect the circle in two points. |
(ii) False. This can be shown by giving a counter example. A chord which is not a diameter gives the counter example. |
(iii) True. In the equation of an ellipse if we put a = b, then it becomes a circle. |
(iv) True, by the rule of inequality |
(V) False. Since 11 is a prime number, therefore \[\sqrt{11}\] is Irrational |
You need to login to perform this action.
You will be redirected in
3 sec