Without using a calculator, write down:
60° in radians,
sin
tan
radians in degrees
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Without using a calculator, write down:
60° in radians,
sin
tan
radians in degrees
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A sector of a circle, , is such that it has radius cm and the angle at its centre, O, is radians.
Find the length of the arc .
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Given that is small, write an approximation, in terms of for
sin cos
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The sector of a circle is shown below.
Find the perimeter of the sector.
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The area of a quarter circle is cm2.
Find the radius of the circle.
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Find all the solutions to the equation sin for .
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The arc length of the sector of a circle is cm.
The radius is twice the length of the arc.
Find the angle at the centre of the circle.
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The diagram below shows the sector of a circle, , radius cm and centre angle radians.
Use the formula ab sin C to find the area of the triangle .
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Find the area of the sector .
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Hence or otherwise find the area of the shaded segment.
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The area of a sector is cm2.
The arc length of the sector is cm.
Find the radius and the angle at the centre of the circle.
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Given that is small, show that sin sin cos .
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Complete the table.
Degrees | Radians | sin | cos | tan |
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A sector of a circle,, is such that it has radius cm and the angle at its centre, , is radians.
Find the length of the arc .
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Given that is small, write an approximation in terms of for
sin cos tan2
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The sector of a circle is shown below.
Find the area and the perimeter of the sector.
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A rainbow-shaped logo is formed from two semicircles as shown below.
The radius of the smaller semicircle is 1 cm less than the radius of the larger semicircle.
Find the area of the logo.
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The diagram below shows the sector of a circle .
Find the area of the sector , giving your answer to 3 significant figures.
Find the area of the triangle , giving your answer to 3 significant figures.
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Find the length of the arc .
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The canopy of a parachute and the outermost connecting cords form a sector of a circle as shown in the diagram below, with the parachutist modelled as a particle at point .
The area of the sector is m2.
Find the length of one of the connecting cords on the parachute.
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Given that is small, show that
sin tan cos
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Hence, or otherwise, find approximate solution(s) to the equation
sin tan cos
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Find all solutions to the equation cos in the interval , giving your answers in radians as multiples of .
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Find all solutions to the equation sin in the interval , giving your answer in radians to three significant figures.
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A plastic puzzle piece is in the form of a prism with a cross-section that is the sector of a circle, as shown in the diagram below. The radius of the sector is cm, and the angle at the centre is radians.
The height of the puzzle piece is cm.
Work out the area of the cross-section.
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The circle sector is shown in the diagram below.
The angle at the centre is radians , and the line segments and have lengths of cm and cm respectively.
Additionally, is parallel to , so that and .
Show that the area of the sector is cm2.
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Show that the area of the triangle is cm2.
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Given that the area of the shaded shape is cm2. find the value of .
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Complete the table.
Degrees | Radians | sin | cos | tan |
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Given that is small, write an approximation in terms of for
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The canopy of a parachute and the outermost suspension lines (cords) form a sector of a circle as shown in the diagram below, with the parachutist modelled as a particle at point .
The area of the sector is m2.
The parachute is made with 40 equal length suspension lines.
Disregarding any additional lengths of cord that might be required for knots, fastenings, etc., find the total length of the suspension lines required to make the parachute.
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A sector of a circle, , is such that it has radius cm and the angle at its centre, , is radians.
Given that the area of the sector in cm2 is three times the length of the arc in cm, find the value of .
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The diagram below shows the sector of a circle .
Given that the area of triangle cm2, find the area of the shaded segment. Give your answer correct to 3 significant figures.
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Find the perimeter of the sector , giving your answer correct to 3 significant figures.
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When is small, show that the equation
cos2 tan4
can be written as
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Hence find approximate solutions to the equation
cos2 tan4
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Comment on the validity of your solutions.
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The circle sector is shown in the diagram below.
The angle at the centre is radians , and the radii and are each equal to cm
Additionally, is parallel to , so that and .
In the case when cm, show that the area of the shaded shape is given by sin .
.
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Show that for small values of , the area of is approximately .
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The diagram shows a prism with cross-section in the shape of a sector of a circle.
The radius of the sector is cm, and the angle at the centre is radians.
The height of the prism is cm.
Given that the volume of the prism is cm3, find the possible value(s) of .
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A rainbow-shaped logo is formed from three semicircles as shown below.
Each of the inner semicircles has a radius that is cm less than that of the next semicircle further out.
Find, in simplest terms, the ratio of the outer area of the logo, to the inner area .
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Find all the solutions to the equation tan in the interval , giving your answers in radians as multiples of .
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Find all the solutions to the equation sin2 sin in the interval , giving your answers in radians to three significant figures.
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Complete the table.
Degrees | Radians | sin | cos | tan |
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Given that is small, find an approximate expression in terms of for
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The canopy of a parachute and the outermost suspension lines (cords) form a sector of a circle as shown in the diagram below, with the parachutist modelled as a particle at point
The area of the sector is m2 .
The length of the arc is m .
Find the length of one suspension line and the angle that the parachutist makes with the two outermost suspension lines.
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Given that is small, find approximate solution(s) to the equation
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Comment on the relative reliability of the solution(s) you found in part (a).
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The diagram below shows the sector of a circle .
Show that the area of the shaded segment is given by cm2.
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Find, in terms of , the percentage of the sector that the segment occupies.
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An evil wizard has captured a unicorn, and is threatening to kill it unless you can answer the following question:
“I wish to create a rainbow-shaped mosaic for the floor of the throne room in my castle.
The mosaic is to be formed from four semicircles as shown below.
The innermost semicircle is to have a radius of metres, and each of the outer semicircles must have a radius that is a constant metres greater than the radius of the next semicircle further in.
The rainbow mosaic must be exactly 22 metres across.
Moreover, I wish the inner part of the area (labelled in the diagram) to take up exactly one quarter of the total area of the rainbow.
Find me the required values of and , or the unicorn dies. Bwah-ha-ha-ha-ha!”
Solve the wizard’s problem and save the unicorn.
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A sector of a circle, , is such that it has radius cm and the angle at its centre, , is radians. The chord has length cm.
Show that .
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Given that and that the area of the sector is cm2 , find the value of .
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Find all the solutions to the equation cos sin cos in the interval , giving your answers in radians as multiples of .
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Find all the solutions to the equation cos2 cos in the interval , giving your answers in radians to three significant figures.
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The diagram below shows the sector of a circle with centre . The radii and are each equal to cm, and the angle at the centre, , is equal to radians. The line is perpendicular to the line .
Given that , show that the area of the shaded shape is given by
cm2.
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