View the step-by-step solution to:

Let h(x) = tan(4x + 8). Video Points possible: 1 This is attempt 1 of 2.

Really need help wtih these derivatives, pleas show way so I can understand how to solve.BBAACC87-EAFC-4498-BA89-B3E0DD8D2341.jpegF89862B0-DC8D-40EE-A460-D62A406CCFE4.jpeg78D2C737-ED5E-40B5-83B5-39E54DFE52DA.jpeg


Let h(x) = tan(4x + 8). Then
h' (1) is
and h'' (1) is
Get help: Video
Points possible: 1
This is attempt 1 of 2.
Message instructor about this question
Post this question to forum


3. Find dy
and find the slope of the line tangent to e" + y? = 2x at the point
bait E= 've x8-Si noiteups sui could
Find ay
if 4cosxcosy = 3y.
visb stit butt .
noitsups orbs
ed dirigilgmi beni
(1,S) is onil toganet adli to woline
nodrupo SIT
Determine which of the following function you need logarithmic differentiation in order to take the derivative.
State which rule is needed for each and take the derivative of each function.
a) y=5*
b) y =x'
c) y = xox


1. A curve is defined implicitly by the equation y" - y= x' +x. Find the derivative of y with respect to x.
2. The equation of this curve is x?y' +2y=3x. Find the equation of the tangent line at (2,1) .
tovipvish sift oilat of rabno ni norsituersflib ofind
gol beon dov noltonot antwollol arinto doldw ouum
.noitorutil dono lo svhavhash out oflar bus doso zot bobsen al slas doidler

Top Answer

Here the all questions' solutions attached with images and... View the full answer

New Doc 2019-05-02 07.24.28_2.jpg

Since sea
slope of tangent\
Here ( x0 : 40) = ( 2 14);
dal ( 4 0 . 9 0 )
scope =\
2 - 0
do ] ( + 1 0)_ _^
te to
( 4 : 0 ; ^
`= 4 AL Le = 1 ]
(` )
4 ( on july 1 7: 34
differentiate !...

Sign up to view the full answer

Why Join Course Hero?

Course Hero has all the homework and study help you need to succeed! We’ve got course-specific notes, study guides, and practice tests along with expert tutors.


Educational Resources
  • -

    Study Documents

    Find the best study resources around, tagged to your specific courses. Share your own to gain free Course Hero access.

    Browse Documents
  • -

    Question & Answers

    Get one-on-one homework help from our expert tutors—available online 24/7. Ask your own questions or browse existing Q&A threads. Satisfaction guaranteed!

    Ask a Question
Ask a homework question - tutors are online