your access code.
It is suggested that you bookmark the Submit Work Form now, but if you
don't you will be reminded later"
Self-critique (if necessary):
------------------------------------------------
Self-critique rating:
*********************************************
Question: `q013. Students often get the basic answers to nearly all,
or even all these questions, correct. Your instructor has however
never seen anyone who addressed all the subtleties in the given
solutions in their self-critiques, and it is very common for a student
to have given no self-critiques. It is very likely that there is
something in the given solutions that is not expressed in your
solution.
This doesn't mean that you did a bad job. If you got most of the
'answers' right, you did fine.
However, in order to better understand the process, you are asked here
to go back and find something in one of the given solutions that you
did not address in your solution, and insert a self-critique. You
should choose something that isn't trivial to you--something you're not
100% sure you understand.
If you can't find anything, you can indicate this below, and the
instructor will point out something and request a response (the
instructor will select something reasonable, but will then expect a
very good and complete response). However it will probably be less
work for you if you find something yourself.
Your response should be inserted at the appropriate place in this
document, and should be indicated by preceding it with ####.
As an answer to this question, include a copy of whatever you inserted
above, or an indication that you can't find anything.
your answer: vvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvv
The graph's 'low point' exists at (0,3). Moving along the graph, as you
go one x increment to the right, your y=4 at the point (1,4). As you
move to the right one x increment, your y=4 as well. (-1,4). Moving
another increment on either side again, your new points are (2,7) and
(-2,7). For each positive or negative x value, there is an equal y
value. The graph is perfectly symmetrical on either side of the y-axis
and it rises exponentially towards the positive y infinity.#######
Submit a copy of this document using the Submit Work Form (detailed URL
is http://vhcc2.vhcc.edu/dsmith/submit_work.htm). The form has
instructions but read the following:
You will be asked to give your work a title. You may use any title
you wish; if you aren't sure what you want to call it, just call it
'First Two Questions' or something of that nature. The title you
choose is the title under which your work will be posted after the
instructor has reviewed it.
You will simply copy and paste everything that precedes this
paragraph, including your answers, Confidence Ratings, self-critiques,
etc., into a box in the form, and click Submit.
Your work will then be posted by the end of the following day, and
often by the end of the day on which you submit it, at your personal
your access code.
It is suggested that you bookmark the Submit Work Form now, but if you
don't you will be reminded later"
Self-critique (if necessary):
------------------------------------------------
Self-critique rating:
#*&!
*********************************************
Question: `q013. Students often get the basic answers to nearly all,
or even all these questions, correct. Your instructor has however
never seen anyone who addressed all the subtleties in the given
solutions in their self-critiques, and it is very common for a student
to have given no self-critiques. It is very likely that there is
something in the given solutions that is not expressed in your
solution.
This doesn't mean that you did a bad job. If you got most of the
'answers' right, you did fine.
However, in order to better understand the process, you are asked here
to go back and find something in one of the given solutions that you
did not address in your solution, and insert a self-critique. You
should choose something that isn't trivial to you--something you're not
100% sure you understand.
If you can't find anything, you can indicate this below, and the
instructor will point out something and request a response (the
instructor will select something reasonable, but will then expect a
very good and complete response). However it will probably be less
work for you if you find something yourself.
Your response should be inserted at the appropriate place in this
document, and should be indicated by preceding it with ####.
As an answer to this question, include a copy of whatever you inserted
above, or an indication that you can't find anything.
your answer: vvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvv
The graph's 'low point' exists at (0,3). Moving along the graph, as you
go one x increment to the right, your y=4 at the point (1,4). As you
move to the right one x increment, your y=4 as well. (-1,4). Moving
another increment on either side again, your new points are (2,7) and
(-2,7). For each positive or negative x value, there is an equal y
value. The graph is perfectly symmetrical on either side of the y-axis
and it rises exponentially towards the positive y infinity.#######
Submit a copy of this document using the Submit Work Form (detailed URL
is http://vhcc2.vhcc.edu/dsmith/submit_work.htm). The form has
instructions but read the following:
You will be asked to give your work a title. You may use any title
you wish; if you aren't sure what you want to call it, just call it
'First Two Questions' or something of that nature. The title you
choose is the title under which your work will be posted after the
instructor has reviewed it.
You will simply copy and paste everything that precedes this
paragraph, including your answers, Confidence Ratings, self-critiques,
etc., into a box in the form, and click Submit.
Your work will then be posted by the end of the following day, and
often by the end of the day on which you submit it, at your personal
your access code.
It is suggested that you bookmark the Submit Work Form now, but if you
don't you will be reminded later"
Self-critique (if necessary):
------------------------------------------------
Self-critique rating:
#*&!#*&!
&#This looks good. Let me know if you have any questions. &#