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Arc SOHCAHTOA method
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04-01-2022, 02:56 AM
(This post was last modified: 04-01-2022 02:58 AM by toml_12953.)
Post: #3
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RE: SOHCAHTOA, for arc-trig
(03-31-2022 09:50 PM)Albert Chan Wrote: Inspired from pi day thread, I discovered a great mnemonic for arc-trig function We measure the height of trees using SOHCAHTOA. We know how far we are from the tree (adjacent) and the angle to sight the top of the tree (θ) so we calculate the height of the tree (opposite) using tan(angle to top of tree) * distance to tree = height of tree. Tom L Cui bono? |
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![[Image: xsohcahtoa.png.pagespeed.ic.4syp_llbS1.png]](https://www.onlinemathlearning.com/image-files/xsohcahtoa.png.pagespeed.ic.4syp_llbS1.png)
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| Messages In This Thread |
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Arc SOHCAHTOA method - Albert Chan - 03-31-2022, 09:50 PM
RE: soh-cah-toa, for arc-trig function - Albert Chan - 03-31-2022, 11:07 PM
RE: SOHCAHTOA, for arc-trig - Albert Chan - 04-01-2022, 05:49 PM
RE: SOHCAHTOA, for arc-trig - toml_12953 - 04-01-2022 02:56 AM
RE: SOHCAHTOA, for arc-trig - Albert Chan - 04-02-2022, 12:10 AM
RE: SOHCAHTOA, for arc-trig - Albert Chan - 04-02-2022, 09:59 AM
RE: SOHCAHTOA, for arc-trig - Albert Chan - 04-02-2022, 01:51 AM
RE: SOHCAHTOA, for arc-trig - Albert Chan - 04-06-2022, 08:46 PM
RE: SOHCAHTOA, for arc-trig - trojdor - 04-07-2022, 08:10 AM
RE: SOHCAHTOA, for arc-trig - Albert Chan - 04-09-2022, 01:07 PM
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