Algebra 2 help please!?!?!??????

3 ANSWERS

1. 
   

   1. this is not algebra, it is kalkulus
   
   2. the formula & all quesshuns R rong
   
   3. I thank "r" is the vertikal komponent av its speed=start speed=13 meters/sekond.
   
   4. gravity is bout 9.8 meter/sek^2, so vertikal speed=
   
   vstart-gt=vstart-9.81t
   
   5. I thank that formula is for the VERTIKAL distans it go.
   
   6. max hite it kan go is same at hite weer yu drop sumthang & it hit ground with speed=13 meter/sek.
   
   7. speed=gt=9.81
   
   for speed=13, t=13/9.81...1.325 sekonds.
   
   vertikal distans=integral av speed=0.5gt^2=9.81*1.755625/2
   
   =8.611 meters
   
   so it will NOT get 10 meters hi.
   
   8. apparently teech rounded g from 9.81 tu 10, so wen divide bi 2 yu get 5t^2

   Report (0) (0)  |   earlier  

2. 
   

   r = rate = velocity = meter/second.  The rate is the constant speed over time, and this is an essential attribute of uniform motion problems involving distance formulas.  In this problem, you are given a distance equation d = rt - 5t^2 were r = rate, t = time(seconds), && 5 is the coefficient.  If the dolphins are jumping out of the water at a velocity of 13m/s, then let r = 13.  To find out how high the dolphin will be after 0.7 || 7 / 10 seconds, you have to do substitution.
   
   Solution(a): Substitute the time t = 0.7 || 7 / 10 into the equation for t.  You can start this by defining the equation as a function of time t, which is: f(t) = r * t - 5 * t^2, which is thus, f(.7) = 13 * (7/10) - 5(7/10)^2 = 91 / 10 - 49 / 20, which concurrently simplifies to: f(.7) = 182 - 49 / 20 = 133 / 20.
   
   Solution(b): This one asks for the time (t) of when the dolphin will be 3 meters above the surface of water.  By using your knowledge of algebraic linear equations, you can solve for t by moving all other terms to the other side and substituting for their respective counterparts.  Thus, f(t) = distance = 3.  This implies setting up the equation with the following values: 3 = 13 * t - 5 * t^2.  By focussing on the form, this equation resembles a general quadratic equation of the form: ax^2 + bx + c, where c = 3, b = -13, && a = 5.  Thus, the quadratic equation is: 5t^2 - 13t + 3 = 0.  This quadratic equation appears to be unfactorable.  Therefore, the only way to solve for t would be to use the quadratic formula, which is of the form: t = -b +-squarerootof(b^2 - 4 * a * c) / 2*a.  By using the quadratic formula and substituting for the respective terms, you get t = 13 +-squarerootof(169 - 60) / 10 = 13 +-squarerootof(109) / 10.  
   
   Solution(c): Same approach for this part except that this time the quadratic formula will not suffice because it will be very impossible to reckon.  The discrimant will result to squarerootof(169 - 4(50)) = squarerootof(-31))(undefined).  Thus, it will be quite impossible for the doplhin to be 10 meters above the surface except when t = 2403/310 (above 10 meters).
   
   J.C

   Report (0) (0)  |   earlier  

3. 
   

   For problem A, R is 13m/s, and T is 0.7s.  Plug the values in and solve.
   
   For B, plug 3m in for D and solve for T.  Note that there may be 2 solutions, one on the way up, and one on the way down.
   
   For C, plug 10m in and see if there's a real solution for D.  Note that
   
   there could be 0 (doesn't get that high), 1 (at the apex), or 2 (on the way up and on the way down) solutions.

   Report (0) (0)  |   earlier