Let p be the statement “x is an irrational number”, q be the statement “y is a transcendental number”, and r be the statement “x is a rational number iff y is a transcendental number”.
Statement –1: r is equivalent to either q or p
Statement –2: r is equivalent to ∼ (p ↔ ∼ q).
Statement −1 is false, Statement −2 is true
Statement −1 is true, Statement −2 is true, Statement −2 is a correct explanation for Statement −1
Statement −1 is true, Statement −2 is true; Statement −2 is not a correct explanation for Statement −1.
Statement −1 is true, Statement −2 is true; Statement −2 is not a correct explanation for Statement −1.
The statement p → (q → p) is equivalent to
p → (p → q)
p → (p ∨ q)
p → (p ∧ q)
p → (p ∧ q)
Consider the following statements:
(a) Mode can be computed from histogram
(b) Median is not independent of change of scale
(c) Variance is independent of the change of origin and scale. Which of these is/are correct?
only (a)
only (b)
only (a) and (b)
only (a) and (b)
If p, q, r are simple propositions with truth values T, F, T, then the truth value of is
true
false
true, if r is false
true, if q is true
If p : It rains today, q : I go to school, r : I shall meet any friends ands : I shall go for a movie, then which of the following is the proportion? If it does not rain or if I do not go to school, then I shall meet my friend and go for a movie.
None of these
The statement is
tautology
contradiction
Neither (a) nor (b)
None of these
C.
Neither (a) nor (b)
p | q | ||||
T | T | F | T | F | F |
T | F | F | F | F | T |
F | T | T | T | T | T |
F | F | T | T | F | F |
If a1, a2 and a3 be any positive real numbers, then which of the following statement is not true?
3a1a2a3
(a1 + a2 + a3)
(a1 . a2 . a3)