yes thanks that was helpful, kinda what i tried at first. i will give it another try and if i still cant get it post up again.
For the second part, you would need to use the first derivative:lol if u get the 2nd part can you post up how to do it!
second one isnt actually that hard. all you have to do is basically use sum and product of roots knowing that roots of the differentiated equation represent the x-coord of the max/min turning point, get it?.lol if u get the 2nd part can you post up how to do it!
You can't really do it that way as using the sum and product of roots would get you two equations, both of them have 1 variable in common where as the other variable is different meaning you cannot solve these using simultaneous equations.
Correct except for the third one.
how do you know which ones go with which when u simultaneous & did you get these equations?For the second part, you would need to use the first derivative:
As the question gave you the turning points,and these points are where the gradients are = 0, simply sub in the x values to obtain 2 equations.
Now you sub in the turning points in to the equation of the curve to obtain another 2 equations.
Using simultaneous equations, the answers will work out nicely to be:
.. if my working out was correct.
do you have to make them both equal zero before you simultanoeus?
Since we see all c's in equation 1 and 2, it would be wise to make equation 3 containing three variables a, b, c too. By inspecting the equations, the only way to make all three equations containing these variables is to eliminate d.