0
What statements is true p is and integer and q is a nonzero integer?
Wiki User
∙ 9y agoWant this question answered?
Be notified when an answer is posted
Add your answer:
Earn +20 pts
What is the converse of If a number is a whole number then it is an integer?
"If a number is an integer, then it is a whole number." In math terms, the converse of p-->q is q-->p. Note that although the statement in the problem is true, the converse that I just stated is not necessarily true.
What is rational numbers but not integer?
A rational number is any number of the form p/q where p and q are integers and q is not zero. If p and q are co=prime, then p/q will be rational but will not be an integer.
How do you construct a truth table for parenthesis not p q parenthesis if and only if p?
Assuming that you mean not (p or q) if and only if P ~(PVQ)--> P so now construct a truth table, (just place it vertical since i cannot place it vertical through here.) P True True False False Q True False True False (PVQ) True True True False ~(PVQ) False False False True ~(PVQ)-->P True True True False if it's ~(P^Q) -->P then it's, P True True False False Q True False True False (P^Q) True False False False ~(P^Q) False True True True ~(P^Q)-->P True True False False
What is a counterexample of the difference of two decimals having their last nonzero digits in the tenths place also has its last nonzero digit in the tenths place?
A counter example is a disproving of an answer. The counterexample to this is basically your saying if you have two nonzero digits in the tenths place and subtract it, you'll always get a nonzero digit in the answer. but if you have 560.4 - 430.4, then you'll get 130.0. there is a zero in the tenths place. I just disproved that you will always get a nonzero digit in the tenths place. 4 - 4 = 0. the 4s represent the tenths place in each of the 4s in the problem. walah. :P
What is the law of modus tollens?
It in Math, (Geometry) If p implies q is a true conditional statement and not q is true, then not p is true.
Which of the following statements is true if p is an integer and q is a nonzero integer?
Then p/q is a rational number.
if p is an p integer and q is a nonzero integer?
if p is an integer and q is a nonzero integer
What statement is true if P is an Integer and Q is a nonzero integer?
Any fraction p/q where p is an integer and q is a non-zero integer is rational.
What statement is true if p is an integer and q is a nonzero integer fraction?
Any fraction p/q where p is an integer and q is a non-zero integer is rational.
What is the converse of If a number is a whole number then it is an integer?
"If a number is an integer, then it is a whole number." In math terms, the converse of p-->q is q-->p. Note that although the statement in the problem is true, the converse that I just stated is not necessarily true.
Is 8 an irrational number?
8 is an integer, which, by definition, are not irrational. In particular, an irrational number is a number that cannot be written in the form p/q for p and q both integers. However, since 8 clearly is equal to 8k/k for any integer k (and for that matter any nonzero number k), 8 is not irrational
If p is a statement which of the statements is the negation of p?
It is ~p.
What does s-p interval mean?
S-P interval means the integer minus the integer. The difference times nine.
The square of any rational number is rational?
Yes - see below. (But the reverse is not true). p is rational so p = x/y where x and y are integers. x is an integer so x*x is an integer, and y is an integer so y*y is an integer. So p2 = (x/y)2 = x2/y2 is a ratio of two integers and so is rational.
Where p and q are statements p and q is called what of p and q?
The truth values.
What is rational numbers but not integer?
A rational number is any number of the form p/q where p and q are integers and q is not zero. If p and q are co=prime, then p/q will be rational but will not be an integer.
What are the origins of using p and q in if-then statements?
There is big deal. x and y are commonly used as variables, p and q are used a statements in logic.
