There are 6 such triples.
There are infinitely many pairs of positive integers that satisfy the equation x - y = 42, starting with (43, 1), (44, 2), (45, 3) and so on.
That will depend entirely on the equation which has not been given.
7
You substitute the value of the variable into the equation and simplify. If the rsult is a true statement then that value of the variable really does satisfy the equation.
The solution to a system on linear equations in nunknown variables are ordered n-tuples such that their values satisfy each of the equations in the system. There need not be a solution or there can be more than one solutions.
There are an infinite number of positive integers that satisfy the equation x^4 + y < 70.
The question cannot be answered unless a specific equation is cited.
The question does not contain an equation nor an inequality. There cannot, therefore be any ordered pairs which can satisfy an expression.
There are infinitely many pairs of positive integers that satisfy the equation x - y = 42, starting with (43, 1), (44, 2), (45, 3) and so on.
The first three positive integers, 1, 2, and 3, satisfy this condition.
I am sorry but the question is incomplete. You have not mentioned the ordered pairs and the equation is incomplete as well.
3x
Of the 729 numbers that satisfy the requirement of positive integers, 104 are divisible by 7.
There are an infinite number of ordered pairs that satisfy the equation.
There are infinitely many ordered pairs. One of these is (0, 0).
The question does not contain an equation nor an inequality. There cannot be any ordered pair which can satisfy an expression.
any odd number >0 that is a whole numberSince there are infinitely many odd positive integers, you will understand that I cannot list all of them, however, they look like this: 1, 3, 5, 7, 9, 11, 13, 15, etc.Answer:The odd positive integers are those that satisfy the equation: Iodd=1+2nWhere: Iodd= Any odd positive integer valuen=any positive integer value