Author Topic: Pure maths 1 problem  (Read 1283 times)

Freaked12

  • Guest
Pure maths 1 problem
« on: May 07, 2010, 04:47:09 pm »
I am finding Question 5 part (i) October/November 2008 difficult to understand.

The function f is such that f(x) = a ? b cos x for 0? ? x ? 360?, where a and b are positive constants.
The maximum value of f(x) is 10 and the minimum value is ?2.
(i) Find the values of a and b.

Freaked12

  • Guest
Re: Pure maths 1 problem
« Reply #1 on: May 07, 2010, 04:49:27 pm »
a - bcos x for O<=  x <=360, where a and b are positive constants.
The max value of f(x) is 10 and the minimum value is -2

nid404

  • Guest
Re: Pure maths 1 problem
« Reply #2 on: May 07, 2010, 04:52:15 pm »
simultaneous equations

a+b=10
a-b=-2

2a=8
a=4

b=10-4=6




Freaked12

  • Guest
Re: Pure maths 1 problem
« Reply #3 on: May 07, 2010, 04:57:11 pm »
simultaneous equations

a+b=10
a-b=-2

2a=8
a=4

b=10-4=6

but why is it a+b and a-b
Where did u get the hint from



nid404

  • Guest
Re: Pure maths 1 problem
« Reply #4 on: May 07, 2010, 06:36:38 pm »
max value of cos x=1

since max value of f(x)=10

a+b=10 (cos x=1)

least value of cos x=-1

since min value  of f(x)=-2
a-b=-2

Freaked12

  • Guest
Re: Pure maths 1 problem
« Reply #5 on: May 07, 2010, 06:52:33 pm »
max value of cos x=1

since max value of f(x)=10

a+b=10 (cos x=1)

least value of cos x=-1

since min value  of f(x)=-2
a-b=-2

Jesus!
feeling embarrased for asking this question.

Thankyou anyways

nid404

  • Guest
Re: Pure maths 1 problem
« Reply #6 on: May 07, 2010, 07:14:15 pm »
lol...happens...

You're welcome :)