Linear equations or inequalities describe points x y that lie on a circle.
First degree equations ad inequalities in one variable are known as linear equations or linear inequalities. The one variable part means they have only one dimension. For example x=3 is the point 3 on the number line. If we write x>3 then it is all points on the number line greater than but not equal to 3.
It is not necessary - it is a convention to distinguish between the end points of a range being included or not in the solution.
yes
the answer is true
This is the center of the circle. From the center of the circle, all the points on the circle are equally distant.
First degree equations ad inequalities in one variable are known as linear equations or linear inequalities. The one variable part means they have only one dimension. For example x=3 is the point 3 on the number line. If we write x>3 then it is all points on the number line greater than but not equal to 3.
x2 + y2 = r2
This starts with the collocation circle to go through the three points on the curve. First write the equation of a circle. Then write three equations that force the collocation circle to go through the three points on the curve. Last, solve the equations for a, b, and r.
It is not necessary - it is a convention to distinguish between the end points of a range being included or not in the solution.
Kathie L. Hiebert has written: 'Implicitly defined output points for solutions of ODEs' -- subject(s): Differential equations 'SLINEQ' -- subject(s): Algebras, Linear, Differential equations, Inequalities (Mathematics), Linear Algebras
Step I: Show that both points are outside the smaller circles. Possibly by showing that distance from each point to the centre of the circle is greater than its radius. Step 2: Show that the line between the two points touches the circle at exactly one point. This would be by simultaneous solution of the equations of the line and the circle.
yes
the answer is true
A circle does not have any points. The circle is completely rounded off.
A segment with end points on a circle is a chord of that circle.
A straight line joining points on a circle is called a "chord" of that circle. If the line happens to pass through the center of the circle, then it's a "diameter" of that circle. The question asked about "points" on a circle, so two points on the circumference of that circle are being considered. (No line can join more than two points of a circle.)
The points in a circle are just points in a circle. Also, a plane cannot be within a circle because planes go on forever in all directions, so a circle can be within a plane.