The solutions of a linear equation in two variables always take integral values
True / false.
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Answer:
True
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3y
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y0 solution for n=1,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y0 solution for n=1,1 solution (1,0) for n=2,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y0 solution for n=1,1 solution (1,0) for n=2,0 solution for n=3,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y0 solution for n=1,1 solution (1,0) for n=2,0 solution for n=3,1 solution (2,0) for n=4,
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y0 solution for n=1,1 solution (1,0) for n=2,0 solution for n=3,1 solution (2,0) for n=4,1 solution (0,1) for n=5, and
What is the number of non-negative integral solutions (x,y) to the linear equation in two variables:n = px + qy,For ex,For n=7, p=2, q=3,7 = 2x + 3yhas 1 such solution (2,1).For p=2, q=5,So for n = 2x + 5y0 solution for n=1,1 solution (1,0) for n=2,0 solution for n=3,1 solution (2,0) for n=4,1 solution (0,1) for n=5, andfor n > 5, you can see that it will always have at least one solution.
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