Minimum Value
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Have you met the First Derivative? You may not need it, but it would help.
Electronics folks know a little trick for amplitude:
a*sin(variable) + b*cos(variable) ==> Total Amplitude = sqrt(a^2 + b^2)
It should look a lot like the Pythagorean Theorem.
In your case, sqrt(1^2 + sqrt(3)^2) = sqrt(1+3) = sqrt(4) = 2
This makes:
Maximum Value = 2
Minimum Value = -2
Electronics folks know a little trick for amplitude:
a*sin(variable) + b*cos(variable) ==> Total Amplitude = sqrt(a^2 + b^2)
It should look a lot like the Pythagorean Theorem.
In your case, sqrt(1^2 + sqrt(3)^2) = sqrt(1+3) = sqrt(4) = 2
This makes:
Maximum Value = 2
Minimum Value = -2
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OK, forget about the derivative. I forgot you weren't up to that, yet. No worries. you'll get there soon enough.
"Amplitude" is a characteristic of your basic trig functions. sin(x) hangs around [-1,1]. It's amplitude is 1. 2*sin(x) hangs around [-2,2]. It's amplitude is 2. That's all it is, just a way to describe some of the features.
A good use is for such a problem as this: Solve sin(x) = 12. Answer: sin(x) doesn't get any bigger than 1, so it can't be 12.
In this case, you may want to pull a sneaky trick.
If f(x) = sin(x/2) - sqrt(3)*cos(x/2),
then f(x)/2 = (1/2)*sin(x/2) - (sqrt(3)/2)*cos(x/2)
= sin(x/2)*cos(pi/3) - cos(x/2)*sin(pi/3)
= sin(x/2 - pi/3),
making f(x) = 2*sin(x/2 - pi/3) and it's a little easier to see.
"Amplitude" is a characteristic of your basic trig functions. sin(x) hangs around [-1,1]. It's amplitude is 1. 2*sin(x) hangs around [-2,2]. It's amplitude is 2. That's all it is, just a way to describe some of the features.
A good use is for such a problem as this: Solve sin(x) = 12. Answer: sin(x) doesn't get any bigger than 1, so it can't be 12.
In this case, you may want to pull a sneaky trick.
If f(x) = sin(x/2) - sqrt(3)*cos(x/2),
then f(x)/2 = (1/2)*sin(x/2) - (sqrt(3)/2)*cos(x/2)
= sin(x/2)*cos(pi/3) - cos(x/2)*sin(pi/3)
= sin(x/2 - pi/3),
making f(x) = 2*sin(x/2 - pi/3) and it's a little easier to see.
tkhunny said:
so u mean..we put everything over 2... and then..
then f(x)/2 = (1/2)*sin(x/2) - (sqrt(3)/2)*cos(x/2)
= sin(x/2)*cos(pi/3) - cos(x/2)*sin(pi/3)
i can't follow how it turns into that. where did pi/3 come from?
what do u mean making it a little easier to see for what?tkhunny said:
i don't understand what we are doing. we are trying to find the minimum of that equation... how do you do that?
1/2 = cos(pi/3)
What he did was make it fit the difference of two angles formula. sin(a+b)=sin(a)cos(b)+cos(a)sin(b)
Then he used it backwards to find sin(a-b).
As they said, sin(anything) has a minimum of -1 so 2sin(anything) has a minimum of -2
What he did was make it fit the difference of two angles formula. sin(a+b)=sin(a)cos(b)+cos(a)sin(b)
Then he used it backwards to find sin(a-b).
As they said, sin(anything) has a minimum of -1 so 2sin(anything) has a minimum of -2
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I may just be barking up excessively dark trees.
I think my most important point is that there are many ways to solve many things. Feel free to pick one you understand, but don't get caught in the trap of thinking there is only one way. You will need all the tools you can get your hands on.
I think my most important point is that there are many ways to solve many things. Feel free to pick one you understand, but don't get caught in the trap of thinking there is only one way. You will need all the tools you can get your hands on.
I told you a couple posts ago that
1/2 = cos(pi/3)
I didn't mention it but...
sqrt(3)/2 = sin(pi/3)
He wanted a trig function so he substituted cos(pi/3) for 1/2 and
sin(pi/3) for sqrt(3)/2
That's where the constants went to.
----------------
Gene
1/2 = cos(pi/3)
I didn't mention it but...
sqrt(3)/2 = sin(pi/3)
He wanted a trig function so he substituted cos(pi/3) for 1/2 and
sin(pi/3) for sqrt(3)/2
That's where the constants went to.
----------------
Gene
tkhunny said:
i am still questioning because the answer is not correct, i'm afraid to say. i think it is because it is not asking of the minimum of the question, but what x is.
the question once again, is: The minimum value of sin(x/2) - squareroot(3)cos(x/2) is attained when x is ?
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Using the identity suggested earlier:
. . .sin(x/2) - sqrt[3]cos(x/2)
. . . . .= 1×sin(x/2) - sqrt[3] cos(x/2)
. . . . .= (2/1)(1/2) [1×sin(x/2) - sqrt[3] cos(x/2)]
. . . . .= 2 [(1/2) sin(x/2) - [sqrt[3]/2] cos(x/2)]
. . . . .= 2 [cos(30°) sin(x/2) - sin(30°) cos(x/2)]
. . . . .= 2 sin(x/2 - 30°)
This will take on its minimum value (of negative two, as noted) when the sine curve is at its minimum. The sine takes on its minimum when the argument is \(\displaystyle \theta\,=\,\frac{3\pi}{2}\), or at 270° (or appropriate repeats, of course). So:
. . . . .x/2 - 30° = 270°
. . . . .x/2 = 300°
. . . . .x = 600°
Check my work! :wink:
Eliz.
. . .sin(x/2) - sqrt[3]cos(x/2)
. . . . .= 1×sin(x/2) - sqrt[3] cos(x/2)
. . . . .= (2/1)(1/2) [1×sin(x/2) - sqrt[3] cos(x/2)]
. . . . .= 2 [(1/2) sin(x/2) - [sqrt[3]/2] cos(x/2)]
. . . . .= 2 [cos(30°) sin(x/2) - sin(30°) cos(x/2)]
. . . . .= 2 sin(x/2 - 30°)
This will take on its minimum value (of negative two, as noted) when the sine curve is at its minimum. The sine takes on its minimum when the argument is \(\displaystyle \theta\,=\,\frac{3\pi}{2}\), or at 270° (or appropriate repeats, of course). So:
. . . . .x/2 - 30° = 270°
. . . . .x/2 = 300°
. . . . .x = 600°
Check my work! :wink:
Eliz.
so then it should be:
2(sin(x/2)cos(pi/3) - sin(pi/3)cos(x/2)
=2sin((x/2) - (pi/3))
(x/2) - (pi/3) =
x = (11pi)/6 ??
like that? i understand y we use (3pi)/2...but i don't understnad... y not use -2?
and i never new that for.... sin(alpha - beta) where (alpha - beta) = minimum??
2(sin(x/2)cos(pi/3) - sin(pi/3)cos(x/2)
=2sin((x/2) - (pi/3))
(x/2) - (pi/3) =
x = (11pi)/6 ??
like that? i understand y we use (3pi)/2...but i don't understnad... y not use -2?
and i never new that for.... sin(alpha - beta) where (alpha - beta) = minimum??
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Nuts! Did I reverse those...again? Okay....
. . .sin(x/2) - sqrt[3]cos(x/2)
. . . . .= 1×sin(x/2) - sqrt[3] cos(x/2)
. . . . .= (2/1)(1/2) [1×sin(x/2) - sqrt[3] cos(x/2)]
. . . . .= 2 [(1/2) sin(x/2) - [sqrt[3]/2] cos(x/2)]
. . . . .= 2 [sin(30°) sin(x/2) - cos(30°) cos(x/2)]
. . . . .= 2 (-cos(x/2 - 30°))
Well, the minimum value is still -2, but it will occur at the maximum for the cosine curve, which would be when the argument equals zero, so:
. . . . .x/2 - 30° = 0°
. . . . .x/2 = 30°
. . . . .x = 60°
...maybe....
Eliz.
. . .sin(x/2) - sqrt[3]cos(x/2)
. . . . .= 1×sin(x/2) - sqrt[3] cos(x/2)
. . . . .= (2/1)(1/2) [1×sin(x/2) - sqrt[3] cos(x/2)]
. . . . .= 2 [(1/2) sin(x/2) - [sqrt[3]/2] cos(x/2)]
. . . . .= 2 [sin(30°) sin(x/2) - cos(30°) cos(x/2)]
. . . . .= 2 (-cos(x/2 - 30°))
Well, the minimum value is still -2, but it will occur at the maximum for the cosine curve, which would be when the argument equals zero, so:
. . . . .x/2 - 30° = 0°
. . . . .x/2 = 30°
. . . . .x = 60°
...maybe....
Eliz.