# Can sage be used to solve the following kind of problem?

"Given that f(1) = 9, f'(1) = 5, g(9) = 6 and g'(9) = 4, what is the approximate value of g(f(1.05))?"

Can sage be used to solve the following kind of problem?

add a comment

0

You can just use the following script to do it. You construct two functions f and g such that they have a slope of 5 and 4 respectively and add a constant such that f(1) = 9 and g(9)=6 then evaluate at 1.05 using g(f(1.05)).

```
f(x)=5*x+4
g(x)=4*x-30
g(f(1.05))
```

Please start posting anonymously - your entry will be published after you log in or create a new account.

Asked: ** 2013-10-10 19:02:53 +0200 **

Seen: **173 times**

Last updated: **Oct 10 '13**

Sage Calculus Tutorial -- continuity practice problems

Sample question: How do I compute symbolic integrals like $\int{sin(x) tan(x)} dx$

How do I understand the result of symbolic integrals

why is symbolic comparison so slow?

Numerical integration in a function

Differentiating Complex Conjugated Functions

Copyright Sage, 2010. Some rights reserved under creative commons license. Content on this site is licensed under a Creative Commons Attribution Share Alike 3.0 license.