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Help with Maths =] (1 Viewer)
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lyounamu
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31.withyou said:
sin3@ + sin@ = 2sin((3@+@)/2)cos(([EMAIL="3@-@)/2"]3@-@)/2[/EMAIL]) = 0
2sin2@cos@ = 0
Therefore, sin2@ = 0 or cos@ = 0
sin2@ = 0 =sin 0
2@ = npi +- (plus and minus) (-1)^n . 0
2@ = npi
@ = npi/2
Or
cos@ = 0 cospi/2
@ = 2npi +- pi/2
33. cos4x+cos2x = 0
2cos((4x+2x)/2)cos((4x-2x)/2) = 0
2cos3xcosx=0
cos3x=0
cos3x = 0 = cospi/2
3x = 2npi +- (plus and minus) pi/2
x = 2npi/3 +- pi/6
or cosx = 0 = cospi/2
x = 2npi +- pi/2
49. sin2x + sin4x = sin3x
2sin3xcosx = sin3x
2sin3xcosx - sin3x
sin3x(2cosx-1) =0
sin3x = 0 or cosx =1/2
3x = npi
x=npi/3
or cosx = 1/2 = pi/3
x = 2npi +- pi/3
I did it nearly 6 months ago so I am not that good but I think I got them right.
By the way, you cannot technically do these questions using the formula from pg 33-34 from Fitzpatrick. These formulas aren't in the syllabus either. So you don't have to know and you won't get these questions. (hardly)
But I heard that it is useful to know them if you want to do 4 Unit maths.
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thanks for the help
how would you graph 2sin[x-(pi/3)] ?
since the max value is 2 and min is -2, i want to try and find the smallest positive values of x for which they have these values.
this is basically Chpater22C Question 5 i]
how would you graph 2sin[x-(pi/3)] ?
since the max value is 2 and min is -2, i want to try and find the smallest positive values of x for which they have these values.
this is basically Chpater22C Question 5 i]
Just shift a 2sinx graph 60 degrees to the right.withyou said:thanks for the help
how would you graph 2sin[x-(pi/3)] ?
since the max value is 2 and min is -2, i want to try and find the smallest positive values of x for which they have these values.
this is basically Chpater22C Question 5 i]
lyounamu
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Amplitute = 2 as you mentionedwithyou said:thanks for the help
how would you graph 2sin[x-(pi/3)] ?
since the max value is 2 and min is -2, i want to try and find the smallest positive values of x for which they have these values.
this is basically Chpater22C Question 5 i]
The period = 2pi/n = 2pi/1 = 2pi (one cycle repeats every 2pi)
The maximum is 2 so maximum occurs when 2sin(x-pi/3) = 2
sin(x-pi/3) = 1
so sin(x-pi/3) = sin pi/2
x-pi/3 = pi/2
x = 5pi/6
Minimum is -2 so minimum occurs when 2sin(x-pi/3) = -2
sin(x-pi/3) = -1
sin(x-pi/3) = -3pi/2
x -pi/3 = -3pi/2
x = -7pi/2
A little bit of info here.
lyounamu
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Using the perpendicular distance formula:withyou said:
Let the point be (x,y)
So, PD between 4x-3y+2=0 and (x,y): absoltue value of (4x-3y+2)/(square root of (4^2 + (-3)^2)) = absolute value of (4x-3y+2)/5
PD between 3x+4y-7 = 0 and (x, y): absolute value of (3x+4y-7)/(square root of (3^2+4^2)) = absolute value of (3x+4y-7)/5
Since it is equidistant, absolute value of (4x-3y+2)/5 = absolute value of (3x+4y-7)/5
absolute value of (4x-3y+2) = absolute value of (3x+4y-7)
Square both sides:
16x^2 + 9y^2 + 4 - 12xy + 8x - 12xy - 6y + 8x - 6y = 9x^2 + 16y^2 + 49 + 12xy - 21x + 12xy - 28y - 21x - 28y
7x^2 - 7y^2 - 45 -48xy + 58x + 44y = 0
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