Solve for X and Find P(-2) | Helpful Homework Solutions

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The discussion revolves around solving three quadratic equations and evaluating a polynomial function. Participants suggest using the quadratic formula for the first two equations, with one user expressing confusion over their complex results. Clarification is sought regarding the interpretation of a term in the third equation, indicating potential ambiguity in the expression. Users encourage sharing work to identify errors and improve understanding. Overall, the thread emphasizes collaborative problem-solving in algebra.
Sope0nARope
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i'm havin trouble with a few problems on my homework so help would be much appriciated

solve for x:

1) 3x^2 - 2x +1=0

2) x^2 -4x + 20 = 0

3) (-2/x+1) + (3/1-x) = 7/x^2-1

and
find p(-2) if P(x) = 2x^4 - x^3 + 4x^2 + -8x + 3

again thanks for any help :)
 
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Look up the quadratic formula for the first three.

For the last one, substitute -2 in everywhere you see x, multiply and add them together.

If you post an attempt, we can help you a bit more.
 
i didnt think of using the quadratic formula i tried it but it still doesn't seem right i got
x=2/3 + or - i root60/6 for the 1st 1

and x = 6,-2 for the 2nd i must be doing something wrong
 
I've got complex answers for both of the first two as well, but they don't match your results. Probably missed a '-' sign somewhere.

For the third one, it looks like your parenthesis are a bit ambiguous.

(-2/x+1)

Is this (-2/x) +1 or -2/(x+1)?

Can you post your work, and we'll find the errors?
 
Thread 'Variable mass system : water sprayed into a moving container'

Thread 'Variable mass system : water sprayed into a moving container'

Starting with the mass considerations #m(t)# is mass of water #M_{c}# mass of container and #M(t)# mass of total system $$M(t) = M_{C} + m(t)$$ $$\Rightarrow \frac{dM(t)}{dt} = \frac{dm(t)}{dt}$$ $$P_i = Mv + u \, dm$$ $$P_f = (M + dm)(v + dv)$$ $$\Delta P = M \, dv + (v - u) \, dm$$ $$F = \frac{dP}{dt} = M \frac{dv}{dt} + (v - u) \frac{dm}{dt}$$ $$F = u \frac{dm}{dt} = \rho A u^2$$ from conservation of momentum , the cannon recoils with the same force which it applies. $$\quad \frac{dm}{dt}...
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