Quick question for you -- not related to a specific problem, more of a strategy question.
I was recently completing a question (OG question so I will not post it). I had memorized the approach and knew what to do, but when it came down to the arithmetic, I was very slow.
E.g. after quickly figuring out the technique, I needed to calculate:
q > 100,000/(0.95*5).
My goal was to determine if q > 21,000.
This is where I got hung up. I can do it, but I am quite slow. My approach:
- I first find 0.95 * 5 (which I do by calculating 5% of 5, then subtracting from 5). I end up with 4.75.
- Then I must divide 100,000/4.75. I can't do this in my head, so I must do long division. (I don't know a way to estimate if 100,000/4.75 > 21,000)
- This whole process can take over a minute, and suddenly I am at 2:30+ minutes for this question, despite knowing exactly how to crack this tricky problem. A bit disheartening because I feel like even if I learn the strategy for tons of questions, I will often get hung up on this arithmetic.
When Tim does this (in the video solution), he seems to do it instantaneously -- "so 0.95 of 5 is 4.75..."
When something takes me so long, I feel like I must be doing something wrong or missing a trick. For this reason, I would be interested to hear:
- a MGMAT Staff's approach to this arithmetic. Do you approach it as I did above? What mini-calculations do you do? Or can you just do it all in your head? Are there tricks I am missing/should know? How are you able to do this quickly enough? (I scanned the Foundation of Math book and couldn't find any techniques I didn't know)
- any suggestions for how to improve these skills.
Any guidance here would be much appreciated.
Thanks,
Dan
PS It is not all arithmetic that trips me up: these two issues (multiplying by a number between 0 and 1, and dividing by a decimal) are particularly slow for me.
PPS: the question is OG13 DS141 if that helps at all.