The points and are given by and
Find a vector equation of the line that passes through points and .
Determine if the point does not lie on the line .
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The points and are given by and
Find a vector equation of the line that passes through points and .
Determine if the point does not lie on the line .
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Find the Cartesian equations of a line that is parallel to the vector and passes through the point
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Find the equation of the line that is normal to the vector and passes through the point , leaving your answer in the form where and
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Consider the two lines and defined by the equations:
Find the scalar product of the direction vectors.
Hence, find the angle, in radians, between the and .
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Consider the lines and defined by:
Show that the lines are not parallel.
Hence, show that the lines and are skew.
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Consider the lines and defined by the equations and
Given that and are coincident, find the value of .
Find the value of .
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Two ships and are travelling so that their position relative to a fixed point at time , in hours, can be defined by the position vectors and
The unit vectors and are a displacement of 1 km due East and North of respectively.
Find the coordinates of the initial position of the two ships.
Show that the two ships will collide and find the time at which this will occur.
Find the coordinates of the point of collision.
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The lines and can be defined by:
Write down the parametric equations for .
Given that and intersect at point ,
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Consider the triangle . The points , and have coordinates and respectively.
M is the midpoint of
Find the coordinates of the midpoint M.
Hence, find a vector equation of the line that passes through points and .
The point is the midpoint of . The line passing through points and can be defined by
Show that the line intersects at the point
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A car, moving at constant speed, takes 4 minutes to drive in a straight line from point to point .
At time , in minutes, the position vector of the car relative to the origin can be given in the form.
Find the vectors and
A cat has decided to take a nap at point
Show that the cat does not lie on the route along which the car drives.
Find the shortest distance between the car and the cat during the movement of the car.
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Point has coordinates and the line is defined by the equations:
Point lies on the line such that is perpendicular to .
Find the coordinates of point .
Hence find the shortest distance from A to the line .
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Find the vector equation of the line with Cartesian equations
A second line runs parallel to and passes through the points and .
Find the value of and
Hence write down the equation of line in Cartesian form.
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A line passes through the points and and lies normal to the vector .
Find the vector equation of .
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Find the obtuse angle formed by the two lines and defined by the equations:
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Consider the skew lines and as defined by:
Find a vector that is perpendicular to both lines.
Hence find the shortest distance between the two lines.
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Consider the lines and defined by the equations:
Given that and are coincident, find the value of and .
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Two spaceships , in a 3D virtual reality game, are moving such that their positions relative to a fixed point at time seconds, , are defined by the position vectors and respectively.
Show that the two spaceships are on course to collide at point and write down the coordinates of .
Spaceship reduces its velocity such that its position vector is now given by
Show that spaceship is still travelling in its original direction.
Show that the distance between the two spaceships can be written as
Hence find the distance between the two spaceships when spaceship is at .
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A car is moving with constant velocity along the line with equation A bird is perched at the point and at , starts to fly at a constant velocity in the direction of the vector .
All distances are measured in metres and time in seconds. The base vectors and represent due east and due west respectively and the base vector points upwards.
Verify that the bird does not collide with the car.
Show that at some point in time the bird will be directly above the car and state the time at which this occurs.
Hence find the distance between the bird and the car at that time.
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Consider the triangle ABC. The points A, B and C have coordinates and respectively. A vector equation of the line that passes through point and the midpoint of is
Find the value of .
Find the vector equation of the line that passes through point B and the midpoint of [AC].
The two lines intersect inside the triangle at point X.
Show that the area of is the area of triangle .
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In the magical kingdom of Cartesia, all positions are measured relative to the ancient stone of power known as the Origin. This reference system corresponds to the standard coordinate system used in mathematics, as shown in the diagram below.
Prince Vector, son of the King Prime of Cartesia, needs to fly on his magical unicorn from the top of the Mystic Pedestal all the way to Cloud City, on an urgent rescue mission.
The Mystic Pedestal is 14 kilometres west and 8 kilometres north of the Origin, and its top is one kilometre up from the level of the Origin. Cloud City is 11 kilometres east and 13 kilometres north of the Origin, and it is 11 kilometres up from the level of the Origin.
Since there is not much time, the prince must fly directly from the top of the Mystic Pedestal to Cloud City. Unfortunately, the unicorn’s magic levels are low. In order for the unicorn to recharge it must pass within 12 kilometres of the Origin during the flight, and must do this before reaching the halfway point between the Mystic Pedestal and Cloud City. If the unicorn does not recharge before this point then it and the prince will crash into the barren wastes and the kingdom will perish.
Using a vector method, determine whether or not the prince will reach Cloud City successfully. Use clear mathematical workings to justify your answer.
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The line has equation and point A has coordinates . Given that the shortest distance between point A and the line is units, find , where .
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A line has the equation and intersects the line with equation at point P, when .
A third line runs parallel to and also intersects at point .
Find the parametric equations of .
Find the distance .
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Consider the two intersecting lines and defined by the equations:
Given that the angle between and is rad, correct to 4 significant figures, find the value of , where .
Find the value of , giving your answer correct to 3 significant figures.
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Consider the two lines and , where passes through the points and and is defined by the Cartesian equations
Find the shortest distance between the two lines.
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Consider the line as defined by the equation .
A point lies at a distance of units perpendicular from a point on .
Find all possible coordinates of .
Given that , write down the set of parametric equations that defines the line that passes through points and .
A third line is defined by the equations .
Determine the relationship between lines and .
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A wheelchair ramp is required to provide access to a building with a door that is located 22 cm above ground level. The maximum angle that a ramp must be from the horizontal is 4.8°.
Calculate the minimum horizontal distance that the ramp must extend out.
The wheelchair ramp is supported by a steel frame. A cross section of the ramp can be seen in the diagram below. A metal strut joins M, the midpoint of [AC], to a point X on the line [AB]. [AB].XM=11.1 cm and =90°.
Using the horizontal distance found in part (a) and assuming that point A is at the origin, use a vector method to calculate the length XB.
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Two drones X and Y are being flown over an area of rainforest to look for signs of illegal logging. Their positions relative to the observation centre, are given by
and
at time minutes after take-off, . All distances are in metres.
Verify that the two drones will not collide.
Find the shortest distance between the two drones and the time at which it occurs.
A third drone Z begins its flight at and its position relative to the observation centre is given by
Each drone can observe a circular area of ground, such that where is the height of the drone above the ground in metres.
Show that the area of ground that can be observed by drone Z five minutes after it takes off overlaps with the area of ground that can be observed by drone Y at that time.
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Consider the tetrahedron ABCD, where A(3, 5, 8), B(-2, 3, 2), C(5, -1, 3) and D(-3, 0, 1). M is the midpoint of the line BC and point P lies along the line DM.
Given that the volume of the tetrahedron ABCP is of the volume of the tetrahedron ABCD, find the Cartesian equations of the line going through points A and P.
X is the midpoint of [AD].
Find the coordinates of the point of intersection between the line found in part (a) and the line going through [MX].
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A car is moving at a constant speed of 15 ms-1 in the direction parallel to the vector Two birds are perched at points and .
At , the car is located at and the bird at point A starts to fly at a constant velocity of ms-1. The bird at point B begins to fly at a constant velocity in the direction of the vector when .
When bird A reaches the position of , both birds and the car lie in a straight line.
Find the equation of the line along which the birds and car lie.
Find the speed at which bird B is travelling.
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