Cellular phone towers infug z.iwew-i: b tn86jj(d(p1 a town are represented by the points P, Q, R, and S (not shown) in the partially complete Voronoi diagram shown below. The regions created by the diagram represent the phone coverag:d twi jz-1 f8.gnuejp6i(w(be provided by each tower.



1.Write down the coordinates of the missing phone tower S. (a,b) a=   b=  
2.Calculate the coverage area provided by phone tower Q. A =    $k{m}^2$
3.Find the gradient of the edge of Voronoi diagram between towers Q and R. $m_{e,QR}$ =   
The phone towers provide different data download speeds, as per the table below.


Tower is P ;Data download speed is 25 MBps ;Tower is R ;Data download speed is 30 MBps ;Tower is Q & S ;Data download speed is 20 MBps ;
4.A customer is located at (4,10). Determine the download speed she receives.

  Consider the Voronoi diagrabl r9ov./s zti r,e2i*m below with sites A, B, C and D, and intersections E ant ls9e2/virr.,*zib o d F.



1.Determine the site closest to the coordinate (9,6).
2.Determine the coordinates of the centre of the largest empty circle.
3.Calculate the area of the largest empty circle. a ≈    $unit{s}^2$

  Points A(1,5)，B(5,9),C(7,7),D(9,3) and E(13,11) represent feedi7d :4d63s gs:ivwqjwxng-racks for dears in the Teutoburg Forest in Germany. The feeding-racks are illustratwgdjv:i:sx647w s d3qed in the following coordinate axes.
Horizontal scale: 1 unit represents 1 km.
Vertical scale: 1 unit represents 1 km.

1.Calculate the gradient of the line segment CE.
Three straight lines are drawn on the coordinate axes to form an incomplete Voronoi diagram. $m_{CE}$ = $\frac{a}{b}$ a =    b =   
2.Find the equation of the line that would complete the Voronoi cell containing site C. Give your answer in the form
ax+by+d=0 where a,b,d∈Z. ax+by+c=0 a =    b =    c =   

3.In the context of the question, explain the meaning of the Voronoi cell containing site C.

  Points A(−3,5), B(5,3), C(3,9), D(3,−3) nk bi9w:l8r9t )te0aw7;a s hiand E(11,5) represent coffee shops in a citk:sa)8ehatwt b9r9 7iw;l in 0y. The coffee shops are illustrated on the following coordinate axes.
Horizontal scale: 1 unit represents 1 km.
Vertical scale: 1 unit represents 1 km.



1.Calculate the gradient of the line segment BE.
The diagram below shows three straight lines that form an incomplete Voronoi diagram.



2.Find the equation of the line completing the Voronoi cell containing site B. Give your answer in the form ax+by+d=0 where a,b,d∈Z. ax+by+c=0 a =    b =    c =   
3.In the context of the question, explain the meaning of the Voronoi cell containing site B.

  The Voronoi diagram below shows four hotels in a smallwmr a;wl-1 8kf town represented by points with coordinates A(−4,4), B1m; akwfl8-rw(3,5), C(3,−3), and D(−1,3). The vertices $V_1$​, $V_2$​ and $V_3$​ are also shown. Distances in the direction of the x and y axes are measured in increments of 100 metres.

  Consider the Voronoi diagram below for a city that contains the towns Aicmbi2ik gm+o5a(+ c7, B, C, ani ++ o ic(igc7mmkab25d D.
The equation of the perpendicular bisector between sites A and D, PB(A,D), is found to be
y=x−25​

1.Determine the equation of the perpendicular bisector between C and D, PB(C,D).y =-$\frac{a}{b}$x+$\frac{c}{d}$ a =    b =    c =    d =   
2.Hence, determine the coordinates of the intersection $V_2$​. (a,b) a=   b=  
3.Determine the optimal position for a toxic waste dump in this city, such that it is as far away from a town as possible.

  Consider the Voronoi diagram ba28 1 s d w6rnuw3zr2j2s)wdrhelow that shows the location of convenient stores within a town. The convenient stores are labelled A, B, C, and D. n2uzrw 2w rrh1w3 628)jssd da
The equation of the perpendicular bisector between sites A and D, PB(A,D), is found to be
y=−x+6​






1.Determine the equation of the perpendicular bisector between sites C and D, PB(C,D).y =$\frac{a}{b}$x-$\frac{c}{d}$ a =    b =    c =    d =   
2.Hence, determine the coordinates of the intersection $V_1$​.
A company that opens and manages convenient stores wants to open a new store in this town. (\frac{a}{b},\frac{c}{d}) a =    b =    c =    d =   
3.Determine the optimal position for this new store, so that it is as far as possible from its nearest store.

  A town currently has four Itazx )/)o ;jnkpag-t2 dllian pizza restaurants. A famous chef wishes to open a new pizza restaurant in the town but wants it to be located as far away as possible from the four current restauranz-lj)t2xdgo /) pak;nts.
The Voronoi diagram below showing the positions of the four current restaurants on a set of coordinates axes: A(2,3) B(8,4), C(7,1), and D(2,1), where one unit represents 1 km.



1.Write down the coordinates of P. (a,b) a=   b=  
2.Show that the coordinates of Q are(5.03,3.32), correct to three significant figures.(a,b) a=   b=  
3.Determine where the famous chef should position their new restaurant.

4.Determine the estimated average weekly number of pizzas this new shop will sell. ≈    pizzas

  The Voronoi diagram below shows the locatiot9cztxyo7wh;8sj 0naun11a;r; (j b e n of fire stations in outback Queensland, a North-Ea1x8ebujtsca o;an1; ;tw0n(zr 7y hj9stern state of Australia.
Horizontal scale: 1 unit represents 100 km.
Vertical scale: 1 unit represents 100 km.



1.Identify the nearest fire-station to houses located at
(1)(300,300)   
(2)(−200,100)   
A house located at (200,200) has an internal fire and requires assistance.
2.Determine which fire-stations the house is closest to.    and   
3.Determine how far the house is from these two fire-stations. Give your answer to the nearest kilometre. d ≈    km

  The Voronoi diagram below shows the location of fire stations in outback Queyabfc(ok+da 9ubjmn j02,2v) ensland, a North-Eastern d ,a2abc9bj u+v oj)0fn2myk(state of Australia.
Horizontal scale: 1 unit represents 100 km.
Vertical scale: 1 unit represents 100 km.



1.Identify the nearest fire-station to houses located at
(1)(300,300)   
(2)(−200,100)   
A house located at (200,200) has an internal fire and requires assistance.
2.Determine which fire-stations the house is closest to.    and   
3.Determine how far the house is from these two fire-stations. Give your answer to the nearest kilometre. d ≈    km

  The Voronoi diagram below shows the fitneshl:9ha2n 5so bjiblr60 +ih8ls studios A, B and C, located in a partiii6o9j+h sbl :r b 0n2lhl5a8hcular district.



1.On the diagram, shade the cell with the missing fitness studio.
2.Determine the coordinates of the missing fitness studio, D.
3.Jennifer lives an equal distance from fitness studios A and D. Find the shortest possible distance Jennifer's house could be from fitness studios A and D. d ≈    km

  The sites A, B (not shown), C, and D in the Voronoi diagram below reanci32q0nap g* b)g l(present the ln2*0gia) pq can(b3glocation of rainfall recording gauges on a large corn farm in Texas, USA.
Horizontal scale: 1 unit represents 1 km.
Vertical scale: 1 unit represents 1 km.

1.Site B is missing from the diagram. Write down its coordinates. B : (a,b) a=   b=  
2.Calculate the area of the cell C. A =    $k{m}^2$
3.Find the distance from point E(9,8) to the nearest rainfall recording gauge.
The table below shows measurements of the average monthly rainfall (mm) of each of the recording gauges. d =    km

4，Estimate the average monthly rainfall at point F(1,6) in mm.    mm