On separate diagrams sketch the graphs of:
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On separate diagrams sketch the graphs of:
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Sketch the graph of for for
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The point has coordinates (90°, 1) and lies on the graph of , where .
Write down the coordinates of the image of point under the following transformations:
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Write down the values for which , for
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The diagram below shows the graph offor
By adding a suitable line to the graph, show that there are four solutions to the equation for
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Given that , write the following functions in terms of .
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Write down all the values of for which , where
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(ii) Given that , use your graph to find another value of in the given
range for which
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By sketching an appropriate graph, find all the solutions of ,
in the interval
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On the same set of axes, sketch the graphs of the following functions:
The sketch must include coordinates of all points where the graph meets the coordinate axes. Also state the periodicity of each function.
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The graph below shows the curve with equation , in the interval
A student states that the curve could also have equation .
Is the student correct? You must give a reason for your answer.
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Give the coordinates of all points of intersection with the coordinate axes within the interval.
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Give another example of an equation that would also produce the same curve.
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The graph below shows the curve with equation in the interval .
Point A has coordinates and is the minimum point closest to the origin. Point B is the maximum point closest to the origin. State the coordinates of B.
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A straight line with equation meets the graph of at the three points , and , as shown in the diagram.
Given that point has coordinates , use graph symmetries to determine the coordinates of and .
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Describe geometrically the transformation that maps the graph of onto the graph of
On the graph of , a point P has coordinates .
State the new coordinates of point P after the transformation to .
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Describe geometrically the transformation that maps the graph of onto the graph of
On the graph of a point has coordinates .
State the new coordinates of point after the transformation to .
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A section of a new rollercoaster has a series of rises and falls. The vertical displacement of the rollercoaster carriage, , measured in metres relative to a fixed reference height, can be modelled using the function where t is the time in seconds.
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On the same set of axes, sketch the graphs of and in the interval .
Show clearly the coordinates of all points of intersection with the coordinate axes.
Deduce the number of solutions to the equation in the interval .
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On the same set of axes, sketch the graphs of and in the interval .
The sketches must include coordinates of all points where the graphs meet the coordinate axes. In each case state the periodicity of the function.
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The graph below shows a curve with equation , , where k is a constant.
A student states that there is only one possible value for k. Explain why the student is incorrect, stating at least two possible values for k.
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Give the coordinates of all points of intersection with the -axis in the given interval.
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The graph below shows the curve with equation in the interval .
Points A and B are the stationary points closest to the origin. State the coordinates of A and B.
.
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A straight line with equation meets the graph of at three points, R, S, and T. Determine the coordinates of R, S, and T.
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Changes in the depth of water in a small tidal estuary relative to a fixed reference depth can be modelled using the function , where is measured in metres, the angle is measured in radians, and t is the time in hours.
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A series of dips and mounds caused by underground mining has a cross-section which can be modelled using the function , where and are respectively the horizontal and vertical displacements, in metres, from a fixed origin point.
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By sketching an appropriate graph, find all the solutions to , in the interval .
.
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On the same set of axes, sketch the graphs of and in the interval . Label the coordinates of points of intersection with the coordinate axes and of maximum and minimum points where appropriate.
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Find the solution to the equation within the interval . Hence, determine the coordinates of the corresponding point of intersection between the two graphs in part (a).
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On the same set of axes, sketch the graphs of and in the interval . Label the coordinates of points of intersection with the coordinate axes.
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Within the interval , determine the coordinates of the two points where . Give your answer in surd form.
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The graph below shows part of the curve with equation , where the angle is measured in radians and k is a constant.
A student states that there are an infinite number of possible values for k. Is the student correct? You must explain your answer fully.
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Another student claims that the curve could also be the graph of the equation . Find a value for k to show that the student is correct.
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The graph below shows two curves with equations and , in the interval , where and are integers.
Using the graph above, find the values of and and label the points of intersection each graph has with the coordinate axes.
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Within the stated interval, the curves intersect at the two points and as shown in the diagram. The coordinates of point are (9.90°, 0.34), accurate to 2 decimal places. By considering the graph, as well as the properties of the sine and cosine functions, state the coordinates of Point S, to two decimal places.
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Describe geometrically the transformation that maps the graph of onto the graph of .
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On the same set of axes, sketch both graphs in the interval .
Label the coordinates of any points of intersection between the two graphs.
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The graph below shows the curve with equation , in the interval . One value of has been labelled .
Use the graph, along with the symmetry properties of the sine function, to verify that
.
.
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A function , first crosses the -axis at .
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