Math 270A Quiz 1
The domain for variable x is the set of all integers. Select the statement that is true. Select one: a) ∃x(x^2 < 1) b) ∃x(3x = 1) c) ∃x( x^2 < 0) d) ∀x(x^2 = 1)
a) ∃x(x^2 < 1)
The domain for variable x is the set of all integers. Select the statement that is false. Select one: a) ∀x(x^2 >= x) b) ∃x(√x = x) c) ∀x(x^2 ≠ 5) d) ∀x(x^2 > x)
d) ∀x(x^2 > x)
Select the statement that is false. Select one: a. If 4 is a prime number, then 6 is a prime number. b. If 4 is a prime number, then 5 is a prime number. c. If 3 is a prime number, then 5 is a prime number. d. If 3 is a prime number, then 6 is a prime number
d. If 3 is a prime number, then 6 is a prime number
The propositional variables s and m represent the two propositions: s: It is sunny today. m: I will bring my umbrella. Give the logical expression that represents the statement: "Despite the fact that it is sunny today, I will bring my umbrella." Use symbols v, ^, and ~ as needed.
s^m
Select the proposition that is a tautology Select one: A) (p∧q) <-> p B) (p∧q) ->p C) (p∧q)-> ~p D) (pVq) -> p
B) (p∧q) ->p
Use De Morgan's law to write the statement that is equivalent to: "It is not true that the patient has high blood pressure or COVID-19."
b: high blood pressure c: COVID-19 ¬(b∨f)≡¬b∧¬f¬(b∨f)≡¬b∧¬f The patient does not have high blood pressure and the patient does not have COVID-19. (Alternatively, the patient has neither high blood pressure nor COVID-19.)
The propositional variables f, h, and p represent the propositions: f: The student got an A on the final. h: The student turned in all the homework. p: The student is on academic probation Select the logical expression that represents the statement: "The student is not on academic probation and the student got an A on the final or turned in all the homework." a) ~ (p^f) V h b) (~p^f) V h c) ~p^(fVh) d) ~p^f^h
c) ~p^(fVh)
p = F, q = T, and r = T. Select the expression that evaluates to false. Select one a) q ^ r b) qVr c) ~q d) pVr
c) ~q
p = T, q = F, and r = T. Select the expression that evaluates to false. a) (q^r) ->~p b) ~(q^r) ->p c) (q^r) -> p d) (p^r) ->q
d) (p^r) ->q
Write the contrapositive of: "If x≠4, then 3x≠12."
If 3x = 12, then x=4
