For example,
the equation of a line: y = ax + b.
the equation of a curve: y = cx2 + dx + e
ax + b = cx2 + dx + e (solve for x)
It is the base of the cone
The slope of a line and the coordinates of a point on the line.The slope of a line and the coordinates of a point on the line.The slope of a line and the coordinates of a point on the line.The slope of a line and the coordinates of a point on the line.
how i do curve line
By differentiating the answer and plugging in the x value along the curve, you are finding the exact slope of the curve at that point. In effect, this would be the slope of the tangent line, as a tangent line only intersects another at one point. To find the equation of a tangent line to a curve, use the point slope form (y-y1)=m(x-x1), m being the slope. Use the differential to find the slope and use the point on the curve to plug in for (x1, y1).
Answer: the name of a line confers to only 2 points and the intersection of two planes is a line. (updated)
Average the x and y (and z if there is one) coordinates to find a midpoint of a line.
If you mean the coordinates of the line x-y = 2 that intersects the curve of x2-4y2 = 5 Then the coordinates work out as: (3, 1) and (7/3, 1/3)
Conic section
It is the base of the cone
Unless the line is a subset of the plane, the intersection is a point.
The phrase is a "conic section".
To measure the point at which two tangents intersect each other, find an equation for each tangent line and compute the intersection. The tangent is the slope of a curve at a point. Knowing that slope and the coordinates of that point, you can determine the equation of the tangent line using one of the forms of a line such as point-slope, point-point, point-intercept, etc. Do the same for the other tangent. Solve the two equations as a system of two equations in two unknowns and you will have the point of intersection.
It means that the coordinates of the point of intersection satisfy the equations of both lines. In the case of simultaneous [linear] equations, these coordinates are the solution to the equations.
A circle is a continuous curve. A vertex is the intersection of two (or possibly more) line segments. A circle has no intersecting line segments. It is a curve, and does not have a vertex or vertices. None at all.
The intersection of the individual graphs. In the simplest case, the graph for each equation consists of a line (or some curve); the intersection is the points where the lines or curves meet.
another point
BC and DE