This question cannot be answered correctly. You will have to give me the value of one of the letters.
p=q
The truth values.
p = q
Nothing at all! It depends on the context.
No, it is not valid because there is no operator between P and q.
Ifp < q and q < r, what is the relationship between the values p and r? ________________p
p=q
The truth values.
p = q
The relational operators: ==, !=, =.p == q; // evaluates true if the value of p and q are equal, false otherwise.p != q; // evaluates true of the value of p and q are not equal, false otherwise.p < q; // evaluates true if the value of p is less than q, false otherwise.p q; // evaluates true if the value of p is greater than q, false otherwise.p >= q; // evaluates true of the value of p is greater than or equal to q, false otherwiseNote that all of these expressions can be expressed logically in terms of the less than operator alone:p == q is the same as NOT (p < q) AND NOT (q < p)p != q is the same as (p < q) OR (q < p)p < q is the same as p < q (obviously)p q is the same as (q < p)p >= q is the same as NOT (p < q)
If B is between P and Q, then: P<B<Q
Suppose the roots a quadratic, in the form ax2 + bx + c = 0, are p and q. Then p + q = -b/a and pq = c/a
It depends on whether the relationship between p and q is linear, quadratic, cubic etc or more complex. For example, if the relationship is quadratic, the equation q = 2p2 - 5p + 3 meets the requirements of the question and gives the value q = 9 when p = 3.386001 (approx).
The answer will depend on what p, q, r and s are, what the relationship between them is, what other information you have or can derive. Since you have chosen not to share any of that information, the answer cannot be more helpful.
p^2+q^2=2(a^2+b^2) where p,q=diagonals of the parallelogram a,b=sides of the parallelogram
The values of p and q work out as -2 and 4 respectively thus complying with the given conditions.
Let p = probability the event will occur; and q = probability the event will not occur. The relationship is p=1-q or q=1-p.