What do you think are two of the trickiest aspects of finding solutions to math problems? When do you have to be most careful to avoid mistakes? Be specific. Then give some suggestions as to steps you can take to avoid making mistakes.

Question

anonymous · Answer

that a negative and negative makes a positive,, double check your work.

anonymous · Answer

? how?

anonymous · Answer

at the end when you the answer plug it back in and make sure it works.

anonymous · Answer

its questions asking for answers... u give your own opinions...

anonymous · Answer

then just answer the first 2 questions please:)

anonymous · Answer

yes i think one of the trickiest aspects in solving  math problems is making sure when you have two negatives the answer is a positive.

anonymous · Answer

my answer to this question would depend on what level of math you are at

anonymous · Answer

true

anonymous · Answer

im in geometry

anonymous · Answer

ugh i hated geometry, hold on and let me think of something

anonymous · Answer

ok and same here!

anonymous · Answer

memorizing trig identities has always been a problem for me... although that might be pre-cal

anonymous · Answer

inverse trig is confusing too

anonymous · Answer

in the triangles you have to use a compass and straight edge to make sure your measurements are exact to find the orthocenter,centroid,etc. It's very easy to accidently move the compass the wrong way or something, you can avoid this by tightening the compass...

anonymous · Answer

@warningiflirt is that really a 'tricky aspect to finding solutions' though? haha

anonymous · Answer

well if you mess up your triangle..... your building well come out weird.

anonymous · Answer

ambiguous case from sine law was prty dumb