Search results
Results from the WOW.Com Content Network
A cartesian equation of a curve is simply finding the single equation of this curve in a standard form where xs and ys are the only variables. To find this equation, you need to solve the parametric equations simultaneously: If y = 4t, then divide both sides by 4 to find (1/4)y = t. This newly found value of t can be substituted into the ...
The curve C has the equation y=((x^2+4)(x-3))/2*x where x is not equal to 0 . Find the tangent to the curve C at the point where x=-1 in the form y=mx+c Answered by Ellie M.
If the two parametric equations have the form x = a t + b and y = c t + d then the first step is to rearrange one to make the parameter 't' the subject. We then substitute this equation for 't' into the other parametric equation and rearrange to make y = f (x). In some cases, 't' may be raised to a power in either equation.
Note: I have a screenshot of the question that I should be able to add to the work space. Q5 C4 June 2014 Edexcel.x + y = 2sqrt(3) cos tStart with x = 4 cos ( t +...
This works because the vector product produces a new vector perpendicular to both your starting vectors, so it must be at right angles to the plane. If on the other hand you know the Cartesian equation of a plane, which looks like (ax)+ (by)+ (cz)=0, then the vector (a,b,c) is a normal vector! There are 2 main methods for finding a normal vector.
Reminder - a cartesian equation is written in terms of x and y (e.g. y = 2x + 3) while parametric equations are written with x and y separately in terms of t. Example: Find the cartesian equation of the curve given by these parametric equations: x = 2t + 1, y = 1/t (where t is not equal to zero) First make t the subject in one of the equations.
A curve is given by the equation y = (1/3)x^3 -4x^2 +12x -19. Find the co-ordinates of any stationary points and determine whether they are maximum or minimun points. Answered by Joseph C.
The equation of such line is easy to find: all we need is a point and the direction vector. The direction vector is given by the coefficients near , and the required point is our point P. These lead us to the following equation of a line in 3D: L=(2,4,-6)+k(1,-2,1), where k is scalar parameter. all we need to do now is to find that parameter.
The curve has equation y = x^3 - x^2 - 5x + 7 and the straight line has equation y = x + 7. One point of intersection, B, has coordinates (0, 7). Find the other two points of intersection, A and C.
It can be shown that the equation of any plane can be given by r.n=a.n, where r = xi + yj + zk, n is a direction vector normal to the plane, and a is any point vector on the plane. a can be found easily (three points are already given in the question for us to choose from – in this case we’ll choose point A for simplicity).