http://www.boardofstudies.nsw.edu.au/hsc_exams/hsc2004exams/pdf_doc/maths_04.pdf
Q8, b ii)
Why can't we find the gradient of the line BA and then take the negative reciprocal and derive the line of the tangent to the parabola this way? The tangent to line BA AND the parabola touches at point C, so I did it the aforementioned way but I came up with an answer of:
y-4x+15=0
which is wrong (tried to substitute point C and != 0 in part iii)
Q5 b)
Also, I'd like to understand the way Q5 b is solved, the differentiation is easy but I have a hard time trying to solve the likes of:
sin (2t) = 0
What I did was jam in values of 0, PI, PI/2, 3PI/4 etc.. and then see if it results in 0. Is there a much more intuitive way to do this?
Last question, I'm a bit confused with part iv) does this mean I have to find the second derivative and check to see if it is < 0 or can we find this from looking at the graph in ii) ? Thanks in advance!
Q8, b ii)
Why can't we find the gradient of the line BA and then take the negative reciprocal and derive the line of the tangent to the parabola this way? The tangent to line BA AND the parabola touches at point C, so I did it the aforementioned way but I came up with an answer of:
y-4x+15=0
which is wrong (tried to substitute point C and != 0 in part iii)
Q5 b)
Also, I'd like to understand the way Q5 b is solved, the differentiation is easy but I have a hard time trying to solve the likes of:
sin (2t) = 0
What I did was jam in values of 0, PI, PI/2, 3PI/4 etc.. and then see if it results in 0. Is there a much more intuitive way to do this?
Last question, I'm a bit confused with part iv) does this mean I have to find the second derivative and check to see if it is < 0 or can we find this from looking at the graph in ii) ? Thanks in advance!
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