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MATHEMATICS ANALYTICAL GEOMETRY
DISTANCE FORMULA: to find length or distance
=( − ) +(
−
)
A. TRIANGLES: Distance formula is used to show
PERIMETER: sum of all the sides
Scalene triangle: 3 unequal sides
Isosceles triangle: 2 equal sides
Equilateral triangle: 3 equal sides
Right angled triangle:
=
+
EXAMPLE 1 : Use the distance formula to show that the triangle below is right angled
R(6;6)
P(-1;3)
Q(1;1)
PR = RQ= PQ=
Pythagorus:
= +
EXAMPLE 2 : Use the distance formula to determine if the triangle below is right angled.
S(0; 2) ST =
TR =
R(-3; -1) T(0; -1) RS =
What other conclusion can you make about the triangle?
= +
EXAMPLE 3 : The vertices of triangle UNR are given U(-6; 1) N(1; 4) R(-3; -6). Use the distance
formula to determine the type of triangle. Is it also right angled?. Calculate the perimeter.
EXAMPLE 4: The vertices of triangle ABC are given, A(-8; 9) N(-2; -1) R(7; 3). Use the distance
formula to determine the type of triangle. Calculate the perimeter.
EXAMPLE 5: The vertices of triangle PQR are given, P(3; 27) Q(0; 0) R(6; 0). Use the distance
√
formula to determine the type of triangle. Calculate the perimeter.
EXAMPLE 6 : Triangle ABC is an isosceles triangle with vertices A(-7; -2) B(-1; Y) C(5; -2) with AB
equal to BC. Find the coordinate of y..
EXAMPLE 7: Triangle DEF is equilateral with vertices D(4; 0) E(-6; 0) F(-1; Y) . Find y.
B. QUADRILATERALS : Distance formula is used to show:
PARALLELOGRAM
RHOMBUS
RECTANGLE
SQUARE
KITE
TRAPEZIUM
1) PARALLELOGRAM CHARACTERISTICS
- opposite sides equal and parallel
- diagonals not equal
- diagonals are cut in half (BISECT) at the midpoint
- corner angles are NOT 90˚
- opposite angles are supplementary
-sum of 4 corner angles = 360˚
2) RHOMBUS - 4 equal sides
- opposite sides equal and parallel
- diagonals not equal
- diagonals are cut in half (BISECT) at the midpoint at 90˚
- corner angles are NOT 90˚
- opposite angles are supplementary
- sum of 4 corner angles = 360˚
3) RECTANGLE - opposite sides equal and parallel
- diagonals ARE EQUAL
- diagonals are cut in half (BISECT) at the midpoint
- corner angles ARE 90˚
- opposite angles are supplementary
- sum of 4 corner angles = 360˚
4) SQUARE - 4 equal sides
- opposite sides equal and parallel
- diagonals ARE EQUAL
- diagonals are cut in half (BISECT) at the midpoint at 90˚
- corner angles are 90˚
- diagonals bisect corner angles into 45˚ + 45˚
- opposite angles are supplementary
- sum of 4 corner angles = 360˚
5) KITE - ADJACENT sides are Equal
- diagonals are not equal
- the long diagonal bisects the short diagonal at its midpoint
- the long diagonal bisects the short diagonal at 90˚
- the long diagonal bisects its corner angles
- the angles at the ends of the short diagonal are equal
- sum of the corner angles = 360˚
6) TRAPEZIUM - 4 sides which are not equal BUT
- ONE PAIR OF OPPOSITE SIDES ARE PARALLEL
NOTE: With the parallelogram, rectangle, rhombus and square, if you can show that 2 PAIRS OF
OPPOSITE SIDES ARE EQUAL then the opposite sides are also PARALLEL.
In each of the following questions below the four vertices of the quadrilateral are given. Draw a
rough diagram and use the distance formula to determine the type of quadrilateral.
EXAMPLE 1: R(-1; 1) A(4; 2) C(2; -1) E(-3; -2)
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