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What is the angle inscribed in a semicircle?
It is a right angle.
When a triangle with one side length the diameter of a circle is inscribed in that circle does it have to be a right triangle?
Yes. It follows from one of the circle theorems which states that the angle subtended in a semicircle is a right angle.
Can any quadrilateral be inscribed in a circle?
yes
How do you put semicircle in scentence?
The cross section of the Ram hemi is a semicircle
Which solid is formed when a semicircle is revolved about a line containing the diameter of the semicircle?
a sphere
What angle inscribed in semicircle?
180 degrees
What is the angle inscribed in a semicircle?
It is a right angle.
What kind of angle is inscribed in a semicircle?
Right Angle?
Angle inscribed in a semicircle?
180 degrees * * * * * No, it is 90 degrees.
What kind of an angle is the inscribed angle that intercepts a semicircle.?
A right angle.
The triangle ABC is inscribed in a semicircle if ABC is 42degrees find A bac B acb?
90
Is every inscribed angle that intercepts a semicircle is a right angle or an acute angle or a obtuse angle?
a right angle
What is the area outside the triangle if the triangle is inscribed in a semicircle while the side length of triangle is 2underroot2?
Diameter of semicircle = 1 Area of semicircle = Pi/8 Area of triangle = 0.25 Area outside triangle = (Pi/8) - 0.25 = 0.1427 (rounded to 4th decimal).
How would you find g field which produces semicircle using equation of semicircle and y?
semicircle PQR of diameter 10 cm.semicircle PAB and BCR of diameter d1 and d2 respectively are inscribed in the semicircle PQR or such that the sum of d1 and d2 is equal to 10 cm. determine the relation between the lengths of arcs PQR,PAB, and BCR.
Prove that the sum of perimeter of inscribed semicircle is equal to the perimeter of outside semicircle?
The circumference of the large semicircle is pi-r radius of the smaller semi circles are r1 r2 r3 r4... thus their circumference is pi-r1 pi-r2 so on.. pi-r = pi(r1+r2+r3..)
State a definition for a polygon inscribed in a sphere?
Inscribed polygon: a polygon contained within a circle, with each side being a chord of a circle.Chord: end points connected to an arc or a semicircle, forming a segment that lies in the interior of a circle.
When a triangle with one side length the diameter of a circle is inscribed in that circle does it have to be a right triangle?
Yes. It follows from one of the circle theorems which states that the angle subtended in a semicircle is a right angle.
