4025808
Well-Known Member
This is for my extension 1 maths homework to be due once i get back to school....
and here are the questions I need help on...
2. Find the acute angle (to the nearest minute) between the curves y=(e^2x) and y=(e^x) + 2 at their point of intersection
3. The curves xy=2e and y=ln(x^2) intersect at P (e, 2). If (θ) is the acute angle between these curves, show that tan(θ) = 4e/(e^2)-4
4. Find the acute angle (to the nearest minute) between the tangents to the curves y=sinx and y=cosx at the point of intersection.
5. Find the size of the obtuse angle (to the nearest degree) between the two curves y=ln((x^2)+1) and y=2ln(x+2) at their point of intersection.
6. The angle between the line y=x/A and the tangent to the curve y=A(x^2) at x=1 is 45*. Find the value(s) of A.
If you can help me it would be greatly appreciated...
and here are the questions I need help on...
2. Find the acute angle (to the nearest minute) between the curves y=(e^2x) and y=(e^x) + 2 at their point of intersection
3. The curves xy=2e and y=ln(x^2) intersect at P (e, 2). If (θ) is the acute angle between these curves, show that tan(θ) = 4e/(e^2)-4
4. Find the acute angle (to the nearest minute) between the tangents to the curves y=sinx and y=cosx at the point of intersection.
5. Find the size of the obtuse angle (to the nearest degree) between the two curves y=ln((x^2)+1) and y=2ln(x+2) at their point of intersection.
6. The angle between the line y=x/A and the tangent to the curve y=A(x^2) at x=1 is 45*. Find the value(s) of A.
If you can help me it would be greatly appreciated...
