Let p:4 is an even integer. q:-5 is a negative prime number. Write each of the following statements in terms ofp, q, and logical connectives: a. 4 is an even integer and-5 is a negative prime number. b. 4 is not an even integer and-5 is a negative prime number. c. If 4 is an even integer, then-5 is a negative prime number. d. 4 is an even integer if and only if-5 is a negative prime number. e. If 4 is not an even integer, then-5 is not a negative prime number 50 MATHEMATICS INTHE MODERN WORLD

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aramisdegaula1977 aramisdegaula1977 · Answer 1 · 2019-09-22T08:53:50+02:00

Answer:

a. [tex]p \wedge q[/tex]

b. [tex]\neg p \wedge q[/tex]

c. [tex]p\Rightarrow q[/tex]

d. [tex]p \Leftrightarrow q[/tex]

e. [tex]\neg p \Rightarrow \neg q[/tex]

Step-by-step explanation:

a. 4 is an even integer and -5 is a negative prime number, can be represented by: [tex]p \wedge q[/tex]

b. 4 is not an even integer and-5 is a negative prime number, can be represented by: [tex]\neg p \wedge q[/tex]

c. If 4 is an even integer, then-5 is a negative prime number, can be represented by: [tex]p\Rightarrow q[/tex]

d. 4 is an even integer if and only if-5 is a negative prime number, can be represented by: [tex]p \Leftrightarrow q[/tex]

e. If 4 is not an even integer, then-5 is not a negative prime number, can be represented by: [tex]\neg p \Rightarrow \neg q[/tex]