HP 48gII User Manual

Page 16-9

Next, we can write

dy/dx = (C + exp x)/x = C/x + e

x

/x.

In the calculator, you may try to integrate:

‘d1y(x) = (C + EXP(x))/x’ ` ‘y(x)’ ` DESOLVE

The result is { ‘y(x) = INT((EXP(xt)+C)/xt,xt,x)+C0’ }, i.e.,

0

)

(

C

dx

x

C

e

x

y

x

+

+

⋅

=

∫

Performing the integration by hand, we can only get it as far as:

0

ln

)

(

C

x

C

dx

x

e

x

y

x

+

⋅

+

⋅

=

∫

because the integral of exp(x)/x is not available in closed form.

Example 3 – Solving an equation with initial conditions. Solve

d

2

y/dt

2

+ 5y = 2 cos(t/2),

with initial conditions

y(0) = 1.2, y’(0) = -0.5.

In the calculator, use:

[‘d1d1y(t)+5*y(t) = 2*COS(t/2)’ ‘y(0) = 6/5’ ‘d1y(0) = -1/2’]

`

‘y(t)’

`

DESOLVE

Notice that the initial conditions were changed to their

Exact

expressions, ‘y(0)

= 6/5’, rather than ‘y(0)=1.2’, and ‘d1y(0) = -1/2’, rather than, ‘d1y(0) = -
0.5’. Changing to these Exact expressions facilitates the solution.

Note: To obtain fractional expressions for decimal values use function Q
(See Chapter 5).