geometry prep2
DESCRIPTION
Geometry Prep.TRANSCRIPT
-
( 0164999097
Complete the following
F In the parallelogram , each two opposite sides are ..and . F In the parallelogram , each two opposite angles are .. F In the parallelogram , each two adjacent angles are .. F In the parallelogram , each two non-adjacent angles are .. F In the parallelogram , the two diagonals .. F The two diagonals of the parallelogram are .and .. F The two diagonals of the square are .and .. F The two diagonals of the rectangle are .and .. F The two diagonals of the rhombus are .and .. F The medians of the triangles intersect at . F The medians of the triangles are concurrence at . F The point of concurrence (intersection) of the median of the triangle divides each
median in the ratio from the base and from the vertex F The length of the median from the vertex of the right angle in the right-angled triangle
= F The number of medians in the right-angled triangle =.. F The number of medians in the Isosceles triangle =.. F The number of medians in the equilateral triangle =.. F The number of medians in the scalene triangle =.. F The number of axis of symmetry in the Isosceles triangle =.. F The number of axis of symmetry in the equilateral triangle =.. F The number of axis of symmetry in the scalene triangle =.. F The length of the side opposite the angle whose measure is 30 in the right-angled
triangle = F The length of the hypotenuse =..the length of the median from the vertex of
the right angle in the right-angled triangle F The length of the hypotenuse =..the length of the side opposite the angle
whose measure is 30 in the right-angled triangle F The two base angles in the isosceles triangle are F The measure of each angle in the equilateral triangle =.. F All sides in the equiangular triangle are F If two angles in any triangle are congruent ,then the two opposite sides to these two
angles are . and the triangle is F If the angles of a triangle are congruent ,then the triangle is F The median of the isosceles triangle drawn from the vertex F The bisector of the vertex angle of the isosceles triangle
geometry For prep 2
-
( 0164999097
F The axis of the line segment is
F Any point belonging to ( on) The axis of the line segment is from its terminals
F The straight line drawn from the vertex of the isosceles triangle perpendicular to its base ..
F The straight line drawn from the vertex of the isosceles triangle perpendicular to its base called .
F The number of medians of any triangle . F The measure of any exterior angle of the equilateral triangle = F The line segment drawn between the two midpoints of two sides in a triangle is
. and .. F If the sum of two adjacent sides length in parallelogram = 10 cm then the perimeter of
it = cm F ABCD is a parallelogram which m(A) + m(B) = 140 , then m(B) = .. F In ABC , if D is the midpoint of BC then is called ..............AD
F in ABC , AB= and m ( ) 55 , then m(A) = ..........AC B = V F in ABC , ADV is a median of it M is the point of intersection of its median , then
AM= AD F in ABC , if m(A) = 50 and m ( ) 80 , then the triangle is ..............B = V F in ABC , if m(A) = 50 and m ( ) 80 , then CB = ..............B = V F If c belongs to the axis of symmetry of AB then = F If the measure of an angle in the isosceles triangle is 100 , then the measure of an
angle of the other two = F If the measure of an angle in the right-angled triangle is 45 , then the number of axis
of symmetry of the triangle = .. F If the length of any side of a triangle = 1
3 the perimeter of the triangle , then the number
of axis of symmetry of this triangle = . F has one axis of symmetry and m( ) 120 then m( A)=.........If ABC B = V IN THE OPPOSITE FIGURE MA = cm MD = .. cm AE = .. cm ME = AE MC = . CD CD = . cm
-
( 0164999097
x = X = .. y = .. Y = ..
M ( ABC) = . X = ..
ABCD is a parallelogram ABCD is a parallelogram M( ABE) = . X = .
X = . It is a parallelogram
PERIMETER OF THE PARALLELOGRAM = . X = y = .
-
( 0164999097
In this figure { }MDCBA =
If DE = 4 cm. , DM = 3 cm. and BE = 6 cm. , Find the perimeter of V BMC
In this figure
BISEC T S C
BD BISECT S BPR OVE T HAT
IS ISO SCELES T RIAN GLE
AB AC
C D
D BC
=
V
-
( 0164999097
PROVE THAT PROVE AC = DE THAT BE = EF FIND BY PROOF ( )M MLY AB = DE = 5 cm Prove that ( ) 90m ADC =
-
( 0164999097
AD = AE PROVE THAT DB =EC PROVE THAT 1 ADE IS AN ISOSCELES TRIANGLE2 AED ADE--
V
PROVE THAT ABC IS AN EQUILATERAL PROVE THAT MC = MD
-
( 0164999097
PROVE THAT PROVE THAT ( ) ( )m EAC m BAD = ( ) ( )m A m D = PROVE THAT PROVE THAT AEC IS EBD IS AN EQUILATERAL ISOSCELES
-
( 0164999097
PROVE THAT PROVE THAT BISECT S
AECED
uuur DC = DB
Draw the isosceles triangle ABC
AB=AC = 4 cm
B C = 6 cm bisect AB at D and AC at E
then draw D E and find its length (don 't rem ove the arcs)
D raw AB C inw hichV
In which AB = AC using the compass
s e c a t D D r a w A D a n d p r o v e A D
b i t B C
B C^