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Cambridge 4U questions (1 Viewer)
- Thread starter richz
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yes thats the onexrtzx said:
z1 - z2 +z3 - z4 = 0
rearranging, z1 - z2 = z4 - z3
taking mods of both sides, |z1 - z2 | = |z4 - z3|
so one pair of opposite sides are equal.
repeating, |z3 - z2| = |z4 - z1|
so the other pair of sides are also equal (remember this defines a parallelogram)
therefore if z1 - z2 +z3 - z4 = 0, then ABCD is a parallelogram
Slidey
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Question 9xrtzx said:hello,
would anyone help me with chp 2 further questions, qs 8 - 14
thnx
z=rcis@
z^2=r^2cis(2@)
Expression becomes:
rcis@/[r^2(cis2@+1)] Go from there.
See the spoiler below for the rest of the working, once you've tried it yourself.
cis@/[r(cis2@+1)]
Multiply top and bottom by [cis(-2@)+1]
[cis(-@)+cis(@)]/[r({cos2@+1}+isin2@)({cos2@+1}-isin2@)]
(2cos@)/[r({cos2@+1}^2+sin^2(2@)]
Which is real.
Simplified further:
2cos@/(r{2+2cos2@})
cos@/(2r.cos^2(@))
1/(2rcos@), the value you're looking for (hopefully)
I think - looks like a bit too much work to me.
Multiply top and bottom by [cis(-2@)+1]
[cis(-@)+cis(@)]/[r({cos2@+1}+isin2@)({cos2@+1}-isin2@)]
(2cos@)/[r({cos2@+1}^2+sin^2(2@)]
Which is real.
Simplified further:
2cos@/(r{2+2cos2@})
cos@/(2r.cos^2(@))
1/(2rcos@), the value you're looking for (hopefully)
I think - looks like a bit too much work to me.
EDIT: I hadn't finished putting in the tags, Estel. I have no intention to spoonfeed. Pitty I can't remove the email tags. Gah. Hopefully that will fix it.
Last edited:
Slidey
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13) Textbook exercise. Well, they all are, but this one especially. Both circles, one centre (0,0) and radius 6, the other (5,0) and radius 5.
Range is the possible y values. arg(z) is a ray which starts at origin (origin not included) and extends based on the gradient of z. Use the diagram from part one.
For the equality part, solve each cricle for y^2, then equate each circle.
Range is the possible y values. arg(z) is a ray which starts at origin (origin not included) and extends based on the gradient of z. Use the diagram from part one.
The range of arg(z) based on the two inequalities is the y-values of the points of intersection of both circles. Remember to exclude 0, though, since origin is not a point on the ray.
For the equality part, solve each cricle for y^2, then equate each circle.