HELP with some hsc past questions (1 Viewer)

donthaveaname · Jun 18, 2009

1984 10ii
The line y = mx is a tangent to the curve y = e3x. Find m.

1992 9c
Let m be a negative number. Show that the equation sin x = mx has x = 0 as its only solution satisfying (between negative pi and pi)

Trebla · Jun 18, 2009

donthaveaname said:
1984 10ii
The line y = mx is a tangent to the curve y = e3x. Find m.

1992 9c
Let m be a negative number. Show that the equation sin x = mx has x = 0 as its only solution satisfying (between negative pi and pi)

For first question:

$\frac{de^{3x}}{dx} = 3e^{3x}\\\\$Equating gradients at point of contact say $ x = x_0\\\\m=3e^{3x_0}\\\\$To find point of contact, let $x=x_0, y = y_0$ and substitute $y_0 = mx_0$ into the curve and solve simultaneously$\\\\mx_0=e^{3x_0}\\\\$But $m = 3e^{3x_0}$\\\\\Rightarrow mx_0=\frac{m}{3}\\\\x_0=\frac{1}{3}\\\\\Rightarrow m = 3e$

For the second question this is easily shown graphically. Alternatively, a more sophisticated algebraic argument would be:
For - π ≤ x < 0,
sin x ≤ 0
and
mx > 0 (since m is negative and x is negative)
Therefore there's no way the two curves can intersect in - π ≤ x < 0 since they never even match in sign

For 0 < x ≤ π,
sin x ≥ 0
and
mx < 0 (since m is negative and x is positive)
Therefore there's no way the two curves can intersect in 0 < x ≤ π since they never even match in sign

When x = 0
sin x = 0
mx = 0
Therefore, intersection occurs at x = 0 and this is the ONLY solution for - π ≤ x ≤ π

HELP with some hsc past questions (1 Viewer)

donthaveaname

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Trebla

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