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Easy Parametrics Q (1 Viewer)
- Thread starter azureus88
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gurmies
Drover
quite a unique question. I think I would just do what you said, 3 equations in 3 unknowns. Using parameters like, p, q, r. I think though the values will be in terms of a?
Timothy.Siu
Prophet 9
i've done this question around 10 times now, but the question isn't like that as well, if its the fitzpatrick question, it's through x^2=4y not x^2=4ayazureus88 said:
theres a few ways u can do this, u might not like my way but here it is
gradient of tangent y'=x/2
gradient of normal -2/x
equation of normal passing through (-12,15)
y-15=(-2/x)(x+12)
y=-2-24/x+15
to find points, we find the intersection of this and equation of parabola y=x^2/4
we get, -2-24/x+15=x^2/4 multiply both sides by 4x and move to one side
x^3-52x+96=0
then we can solve this polynomial,x=2,x=6 x=-8 and find the y values and ur done
gurmies
Drover
Very nice method there
Hmm i might just add some more parametrics questions (well at least i think they're parametrics questions coz the stupid sheet just ses "Parabola:... ><')
Okay first one
Find the equation of the tangent at the point P(8,2) on the parabola x2=32y. If this tangent meets the tangent at the vertex of the parabola at Q, find the coordinates of Q.
( I got the first part in this question, it's the second part thats gotten me stumped)
Find the equation of the directrix of the parabola x2=-12y. The equation of the tangent at the point (-6,-3) on this parabola meets the directrix at T. Find the coordinates of T.
P(-2,1) and Q(6,9) are points on the parabola x2=4y.
The line through M, the midpoint of PQ, parallel to the axis of the parabola meets the parabola in N.
i) Find the coordinates of M and N.
ii) Show that the tangent at N is parallel to the chord PQ.
Okay first one
Find the equation of the tangent at the point P(8,2) on the parabola x2=32y. If this tangent meets the tangent at the vertex of the parabola at Q, find the coordinates of Q.
( I got the first part in this question, it's the second part thats gotten me stumped)
Find the equation of the directrix of the parabola x2=-12y. The equation of the tangent at the point (-6,-3) on this parabola meets the directrix at T. Find the coordinates of T.
P(-2,1) and Q(6,9) are points on the parabola x2=4y.
The line through M, the midpoint of PQ, parallel to the axis of the parabola meets the parabola in N.
i) Find the coordinates of M and N.
ii) Show that the tangent at N is parallel to the chord PQ.
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problems related to Locus not sure if it fits into parametrics though... 
1. The area o the triangle enclosed by a variable line L and the axes is 8square units. M is the midpoint of the line segment on L cutting by the axes. Find the equation of the locus of M.
2. A point A moves on the line 5x-y+3=0 while a point B moves on the curve x2=y+3, and AB is parallel to the y-axis. Find the equation of the locus of the midpoint M of AB.
3. A line has slope m and y-intercept m+2. Another line has slope m+1 and y-intercept 1. Find the locus of the intercepting point of the two lines as m varies.
1. The area o the triangle enclosed by a variable line L and the axes is 8square units. M is the midpoint of the line segment on L cutting by the axes. Find the equation of the locus of M.
2. A point A moves on the line 5x-y+3=0 while a point B moves on the curve x2=y+3, and AB is parallel to the y-axis. Find the equation of the locus of the midpoint M of AB.
3. A line has slope m and y-intercept m+2. Another line has slope m+1 and y-intercept 1. Find the locus of the intercepting point of the two lines as m varies.
ok, i got the following answers (which are probably wrong):Fortian09 said:problems related to Locus not sure if it fits into parametrics though...
1. The area o the triangle enclosed by a variable line L and the axes is 8square units. M is the midpoint of the line segment on L cutting by the axes. Find the equation of the locus of M.
2. A point A moves on the line 5x-y+3=0 while a point B moves on the curve x2=y+3, and AB is parallel to the y-axis. Find the equation of the locus of the midpoint M of AB.
3. A line has slope m and y-intercept m+2. Another line has slope m+1 and y-intercept 1. Find the locus of the intercepting point of the two lines as m varies.
1. xy=1
2. y=(x^2 + 5x)/2
3. y=x^2 +1
clintmyster
Prophet 9 FTW
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like azureus said, if you want correct solutions, inform us of the answers first!Fortian09 said:
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1) Let the intercepts of the line L be (x1,0) and (0,y1)Fortian09 said:problems related to Locus not sure if it fits into parametrics though...
1. The area o the triangle enclosed by a variable line L and the axes is 8square units. M is the midpoint of the line segment on L cutting by the axes. Find the equation of the locus of M.
2. A point A moves on the line 5x-y+3=0 while a point B moves on the curve x2=y+3, and AB is parallel to the y-axis. Find the equation of the locus of the midpoint M of AB.
3. A line has slope m and y-intercept m+2. Another line has slope m+1 and y-intercept 1. Find the locus of the intercepting point of the two lines as m varies.
x1y1 / 2 = 8
x1y1 = 16
Midpoint of L is M (x1 / 2,y1 / 2)
So locus of M is with x1 and y1 parameters:
x = x1 / 2
y = y1 / 2
xy = x1y1 / 4
.: xy = 4
2) Let A be (x1, y1) and B be (x1, y2) as AB is parallel to the y-axis, so
5x1 - y1 + 3 = 0
x1² - y2 - 3 = 0
Adding the above equations:
5x1 + x1² - y1 - y2 = 0
Midpoint of AB is M(x1, [y1 + y2] / 2)
Locus of M is:
x = x1
y = (y1 + y2) / 2
=> 2y = y1 + y2
Using:
5x1 + x1² - y1 - y2 = 0
5x + x² - 2y = 0
3) The equation of the lines are y = mx + m + 2 and y = (m + 1)x + 1
Finding intersecting points:
mx + m + 2 = mx + x + 1
=> x = m + 1
Sub into y = (m + 1)x + 1
.: y = x² + 1
Thanks for some useful help
I have a problem constructing parametric equations... >< :$
and a few cartesian equations.
1. x=t2-2t, y=t2+2
2. x=t2+t, y=(t2/2) - 3t
3. x=3[t+(1/t)], y=4[t-(1/t)]
4. x=1/2 (at+a-t), y=1/2 (at-a-t)
5. x=7(sec@+tan@), y=7(sec@-tan@)
6. x=t+ 1/t, y=t- 1/t
7. 2x-y+4=0
8. x[/sup]2[/sup]+y2=9
A=(5,-4), B = (-3,2). Find the locus of P if the point P(x,y) move such that the distance of P from the line AB equal s distance of P from x=5.
I have a problem constructing parametric equations... >< :$
and a few cartesian equations.
1. x=t2-2t, y=t2+2
2. x=t2+t, y=(t2/2) - 3t
3. x=3[t+(1/t)], y=4[t-(1/t)]
4. x=1/2 (at+a-t), y=1/2 (at-a-t)
5. x=7(sec@+tan@), y=7(sec@-tan@)
6. x=t+ 1/t, y=t- 1/t
7. 2x-y+4=0
8. x[/sup]2[/sup]+y2=9
A=(5,-4), B = (-3,2). Find the locus of P if the point P(x,y) move such that the distance of P from the line AB equal s distance of P from x=5.
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To construct cartesian equations from parametric equations, you gotta try to eliminate the parameter.
1. x=t^2 - 2t (1)
y= t^2 + 2 (2)
y-x = 2+2t
so t = (y-x-2)/2
substitute this into eqn (1) or (2)
2. x=t<SUP>2</SUP>+t
y=(t<SUP>2</SUP>/2) - 3t
2y=t^2 - 6t
x-2y = 7t
so t = (x-2y)/7
substitute this into initial equation
3. x=3[t+(1/t)]
y=4[t-(1/t)]
x/3 = t+(1/t)
y/4 = t-(1/t)
[t+(1/t)]^2 = [t-(1/t)]^2 + 4
so x^2/9 - y^2/16 = 4
the rest follow similar procedures. for 5, use the identity sec^2@ - tan^2@ =1
1. x=t^2 - 2t (1)
y= t^2 + 2 (2)
y-x = 2+2t
so t = (y-x-2)/2
substitute this into eqn (1) or (2)
2. x=t<SUP>2</SUP>+t
y=(t<SUP>2</SUP>/2) - 3t
2y=t^2 - 6t
x-2y = 7t
so t = (x-2y)/7
substitute this into initial equation
3. x=3[t+(1/t)]
y=4[t-(1/t)]
x/3 = t+(1/t)
y/4 = t-(1/t)
[t+(1/t)]^2 = [t-(1/t)]^2 + 4
so x^2/9 - y^2/16 = 4
the rest follow similar procedures. for 5, use the identity sec^2@ - tan^2@ =1
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Timothy.Siu
Prophet 9
7. 2x-y+4=0
x=t-2 y=2t
8. x2+y<SUP>2</SUP>=9
x=t y=sqareroot(9-t2)
i think...
u can just sub in random stuff
x=t-2 y=2t
8. x2+y<SUP>2</SUP>=9
x=t y=sqareroot(9-t2)
i think...
u can just sub in random stuff