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The angles in a triangle are in the ratio 2:6:1. Find the sizes of these angles?

What is the perpendicular distance from the third side to the point?

In the figure A1, is the area bounded by a square and a quarter circle with center a vertex of the square. A2 is the area bounded by the square and the circle. What is the ratio of A1 to A2?

Two circles having radii #a#and #b# touch each other externally. If #c# is the radius of another circle which touches these two circles as well as a common tangent to the two circles, how do we prove that #1/sqrtc=1/sqrta+1/sqrtb#?

ABCD is a parallelogram
Question is (Pink Area)/(All area)=? (Ratio)

ABC is an isoscles triangle in which AB=AC. A circle passing through B and C intersects the sides AB and AC at D and E respectively then show that DE is parallel to BC?

In triangle ABC, BD is a median. CF intersects BD at E so that BE = ED. Point F is on AB. Then, if BF = 5. What is the value of AB?

Please solve q 116 ?

Please solve q 106 ?

Please solve q107 ?

Please solve q 105 ?

Please solve q 104 ?

A rectangle is inscribed in an equilateral triangle, with one side on a side of the triangle. If the triangle has side of length 2, what is the maximum possible area of the rectangle?

All shapes in the picture are halfcircles. If the radius of the smaller halfcircle is 1, what is the area of the colored region?

Please solve q 93 ?

Please prove?

Please solve q 94 ?

Please solve q 91?

Please solve q 80 ?

Please solve q 87 ?

What is eb?

Please solve q 59 ?

How do I do this? See picture below

Please solve q 71 ?

Please solve q 76 ?

Please solve q 12 ?

Please solve q 37 ?

Please solve q 18?

Please solve q 21?

Please solve q 96 ?

Please solve q 52 ?

Please solve q 57 ?

Please solve q 42 ?

Please solve q 42 ?

Please solve q 46 ?

Please solve q 24 ? Look

How do you prove this triangle to be equilateral?

Please solve q 19?

Can someone please prove this?

A chord of a circle divides the circle into two parts such that the squares inscribed in the two parts have areas 16 and 144 square units. the radius of the circle, is?

Please solve q 20?

Please solve q 11 ?

Please solve q 9 ?

Please solve q 7?

The parallelogram ABCD shows the points P and Q dividing each of the lines AD and DC in the ratio 1:4. What is the ratio in which R divides DB? What is the ratio in which R divides PQ?

A triangle has corners at #(1 ,9 )#, #(5 ,4 )#, and #(6 ,2 )#. How far is the triangle's centroid from the origin?

Please solve q 6?

ABC is a triangle with D and E as the mid points of the sides AC and AB respectively.
G and F are points on side BC such that DG is parallel to EF. Prove that the area of triangle ABC=#2xx# area of quadrilateral DEFG.?

ABC is a triangle with D and E as the mid points of the sides AC and AB respectively.
G and F are points on side BC such that DG is parallel to EF. Prove that the area of triangle ABC=#2xx# area of quadrilateral DEFG.?

It is about coordinate and geometry want help in part 1?

What are the 6 point that divide the line between (5,4) and (13,22)?

The angles of a triangle are 40°, 60°, 80° and a circle touches its sides at P, Q, R, calculate the angles of triangle PQR?

Can someone help me solve for this angle?

ABC is a triangle. BAD is 40 degrees, DAC is 20 degrees, ABE is 60 degrees and DBE is 10 degrees. What is angle CDE (angle x)?

In the center circle O the angle BOA = 2ABD. How much does the angle measure BCA?

What are the coordinates of point P, that lies #1/5# of the way from #A(7,35)# to #B(8, 5)#?

You are standing 40 meters from the base of the tree that is leaning 8° from the vertical away from you, the angle of elevation from your feet to the top of the tree is 20°50, what is the height of the tree?

Please solve q 38?

Could someone please help me find the length of x?

Start with #DeltaOAU#, with #bar(OA) = a# , extend #bar(OU)# in such a way that #bar(UB) = b#, with #B# on #bar(OU)#. Construct a parallel line to #bar(UA)# intersecting #bar(OA)# at C. Show that, #bar(AC) = ab#?

The sum of two integer is 88.if greater is divided by smaller the quetioent is 5 and reminder is 10. Finf the integer?

Bedlam scores 92marks in mathematics and 96marks in Science write the ratio of marks scored in Science to the marks scored in mathematics in the simplest form ?

Angles problem?

Angles help?

Referring to the figure, find the value of x.
I don't understand please show me the steps as well?

A triangle has corners at #(5 ,3 )#, #(4 ,6 )#, and #(8 ,5 )#. If the triangle is dilated by a factor of #2 # about point #(3 ,2 )#, how far will its centroid move?

A straight line through the point (2,2) intersects the line √3x+y=0 and √3xy=0 at the points A and B. What is The equation to the line AB show that the triangle aob is equilateral?

Solve this question please?

The radius of the largest circle lying in the first quadrant and touching the line 4x+3y12=0 and the co ordinate axis is?

Please solve this?

Chloe has 20 unit cubes. How many different rectangular prism can she build with the cubes?

What is the area of the question mark?
The opposite lines are not necessarily parallel.

Find the area of the kite in cm2?
Round to 2 decimal places.

Triangle ABC has coordinates of A(8, 8), B(4, 2), and C(2, 2). What are the coordinates of its image after a dilation centered at the origin with a scale factor of 1.5?

What is the max value?

Two chords XY and PQ are intersecting at the point A. The line segment Joining X and P is a diameter of the circle, angle XAP= 120° and XY= PQ= 18 cm. Find the distance between the centre of the circle and the point A .Could you please help me?

Find the vertices of the image of triangle #PQR# having the vertices #P(1,2) Q(3,5) and R(0,4)# under the enlargement with scale factor #2# and centre at origin?

Im stuck in these 2 problems. Can someone help me?

How to find the coordinates of point S?

How to calculate triangle MNP ?

Two chords XY and PQ are intersecting at the point A. The line segment Joining X and P is a diameter of the circle, angle XAP= 120° and XY= PQ= 18 cm. Find the distance between the centre of the circle and the point A .Could you please help me?

The chord of circle #x^2 + y^2 = 25# connecting #A(0,5)# and #B(4,3)# is the base of an equilateral triangle with the third vertex #C# in the first quadrant. What is the smallest possible #x#coordinate of #C#?

The chord of circle #x^2 + y^2 = 25# connecting #A(0,5)# and #B(4,3)# is the base of an equilateral triangle with the third vertex #C# in the first quadrant. What is the smallest possible #x#coordinate of #C#?

Given: Line segment with endpoints A(‒6,6) and B(6,‒3).
Prove: If the coordinates of Y is (2,0), prove that Y is twothirds of the way from A to B?

If LMN is an equilateral triangle and X is the mid point of LN. prove that #MX^2 = 3/4MN^2#?

How to calculate triangle MNP ?

Calculate the area a brick region? The length from the base of the rectangle to the top of the arc is called "Sagita". The small side of the bridge into the sagita, #e=21#.

An equilateral triangle and a regular hexagon have equal perimeters. if the area of the triangle is 2, what is the area of the hexagon?

A circle is inscribed in an equilateral triangle with a side length measuring 10 mm.
Represent the area of the shaded region as a percentage of the total area of the triangle?

Quick math question! Please help!?

How do I calculate the height of the semitruck using sine?

Math Help???! Please?

How to answer these questions step by step ?

Geometry: Similarities?

We want to draw a number of straight lines such that for each square of a chessboard, at least one of the lines passes through an interior point of the square. At least how many lines we need for a 3x3 chessboard?

ABCD is a square piece of paper. M and N are the respective midpoints of AB
and CD. P is a point on AM such that if the piece of paper is folded along DP,
then A lands on a point Q on the segment MN. What is the degree of #angle#ADP ?

The base BC of an equilateral triangle ABC lies on yaxis. I the coordinates of the point C ate(0,3). The origin is the midpoint of the base BC, find the coordinates of the points A and B?

Why do the midpoints of a rhombus form a rectangle? Solved in a paragraph proof.

Question: In the rhombus ABCD, AP is constructed perpendicular to BC and intersects the diagonal BD at Q.
How to work this out? (working outs + reasons and explanations)

In #\triangle DEF#, #M# is the centroid. (i). Find #\overline{MK}# and #\overline{DK}# #" "# (ii). Find #\overline{LM}# and #\overline{LE}# #" "# (iii). Write an expression for #FJ#?

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