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Math help :-)
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? -- Dave - The Medway Handyman www.medwayhandyman.co.uk |
Math help :-)
"Tim Streater" wrote in message ... In article , The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? Well if it slopes 15deg then the angle it makes with the wall is 90-15 = 75deg. So if it extends out Z (which you say is 1m to 4m), then that's the hypotenuse of the triangle in which case the vertical height of the triangle is given by: H / Z = cos 75 So: H = Z * cos 75 But you said the front edge is up by 2.1m so that gives you: X = 2.1 + H or X = 2.1 + (Z * cos 75) if Z=2 then I type this into Google: 2.1 + (2 * cos (75 deg)) and it gives me 2.617.... No need for a spreadsheet at all. or even a calculator cos (75) is 0.258 so rounding it down a bit it's Y +0.25(Z) tim |
Math help :-)
On Sat, 27 Jul 2013 11:07:51 +0100, The Medway Handyman
wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? SOHCAHTOA. -- Frank |
Math help :-)
On 27/07/2013 11:54, Tim Streater wrote:
In article , The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? Well if it slopes 15deg then the angle it makes with the wall is 90-15 = 75deg. So if it extends out Z (which you say is 1m to 4m), then that's the hypotenuse of the triangle in which case the vertical height of the triangle is given by: H / Z = cos 75 So: H = Z * cos 75 But you said the front edge is up by 2.1m so that gives you: X = 2.1 + H or X = 2.1 + (Z * cos 75) if Z=2 then I type this into Google: 2.1 + (2 * cos (75 deg)) and it gives me 2.617.... No need for a spreadsheet at all. Here's the diagram . |\ | \ | \ | \ Z | \ |H \ | \ | \ | \ .---------. | | | | | 2.1 | | | My understanding is that 2m is the horizontal distance ('it extends out Z'), so it's different from that. |\ | \ | \ | \ | \ |X-Y \ | \ X| 15\ --------- | Z | | | Y | | | (X-Y)/Z = tan 15 .. .. .. X = Y + Z (tan 15) Spreadsheet with Y in A1, Z in B1, then C1 is =A1+(B1*TAN(RADIANS(15))) which gives 2.64 for the given values. HTH -- Peter |
Math help :-)
On 27/07/2013 11:07, The Medway Handyman wrote:
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? Tan @ 15 degrees is your calculation = 0.268. That is then the ratio between the width of the awning and the increase in height. |
Math help :-)
The Medway Handyman :
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? The easy way to answer this and similar questions is to make a scale drawing. It doesn't have to be anything fancy, all you need is pencil, paper, and ruler. A spreadsheet would be quicker and more accurate but a drawing would be accurate enough and would give you a better feel for what the result would look like. -- Mike Barnes |
Math help :-)
On Sat, 27 Jul 2013 11:07:51 +0100, The Medway Handyman
wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? I assume you mean 15 degrees below horizontal. "Depenfing on the width" - of what, measured how? I assume you measure the extension E down the sloping face, not horizontally. X=Y+Esin15 i.e. X=Y+(0.26 x E) Your example would be X=2.1 + 0.26x2, i.e. 2.62m If you can add the Y in your head, all you need to remember is that X is 0.26xE above Y. -- Dave W |
Math help :-)
On Sat, 27 Jul 2013 12:17:39 +0100, Frank Erskine
wrote: SOHCAHTOA. Oswald Has Been Here Obtaining Beer (but nothing to remember which was which - Sine, Cosine, Tan) B=base [from at least 50yrs ago :( ] -- AnthonyL |
Math help :-)
On 27/07/2013 14:15, Tim Streater wrote:
In article , Ramsman wrote: On 27/07/2013 11:54, Tim Streater wrote: Well if it slopes 15deg then the angle it makes with the wall is 90-15 = 75deg. So if it extends out Z (which you say is 1m to 4m), then that's the hypotenuse of the triangle in which case the vertical height of the triangle is given by: H / Z = cos 75 So: H = Z * cos 75 But you said the front edge is up by 2.1m so that gives you: X = 2.1 + H or X = 2.1 + (Z * cos 75) if Z=2 then I type this into Google: 2.1 + (2 * cos (75 deg)) and it gives me 2.617.... No need for a spreadsheet at all. Here's the diagram . |\ | \ | \ | \ Z | \ |H \ | \ | \ | \ .---------. | | | | | 2.1 | | | My understanding is that 2m is the horizontal distance ('it extends out Z'), so it's different from that. |\ | \ | \ | \ | \ |X-Y \ | \ X| 15\ --------- | Z | | | Y | | | (X-Y)/Z = tan 15 . . . X = Y + Z (tan 15) Spreadsheet with Y in A1, Z in B1, then C1 is =A1+(B1*TAN(RADIANS(15))) which gives 2.64 for the given values. Well, only Our Dave knows whether the Z refers to the length of material that has unrolled from the sunroof (my interpretation) or refers to the horizontal distance extended (your interpretation). Either way, once you have the formula, no spreadsheet is needed. I just typed my formula straight into Google and it gave me the answer. As we were always told at school, read the question. TMH said 'I want to make up a spreadsheet to calculate this for any height "Y" and any extension.' Hence my reply and my formula. -- Peter |
Math help :-)
The Medway Handyman wrote:
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? Personally I'd do a scale drawing and use that. This sort of thing http://www.wrightsaerials.tv/referen...ed-by-roof.pdf Bill |
Math help :-)
On 27/07/2013 15:49, Tim Streater wrote:
In article , Ramsman wrote: On 27/07/2013 14:15, Tim Streater wrote: Either way, once you have the formula, no spreadsheet is needed. I just typed my formula straight into Google and it gave me the answer. As we were always told at school, read the question. TMH said 'I want to make up a spreadsheet to calculate this for any height "Y" and any extension.' Hence my reply and my formula. And I'm pointing out that you don't need one. For any given extension, just get google to do it or use your handy pocket calculator. A spreadsheet is overkill - unless you are learning spreadsheets. But then we weren't told that. 'I want to make up a spreadsheet to calculate this for any height "Y" and any extension.' Perhaps you don't need one, but that's what he clearly asked for, so that's what I gave him. Having set it up, you only have to enter the values and recalculate each time. -- Peter |
Math help :-)
On 27/07/2013 11:07, The Medway Handyman wrote:
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? You can make up an Excel spreadsheet as follows: Put in awning front height - in metres - in column (say) D3 Then put the awning width (by that I mean front to back) - again in metres - in column D5 Then put the slope - in degrees - in column D7 Your final column, which will give the height of the rear of the awning, will need the following formula: =TAN(D7*PI()/180)*D5+(D3) |
Math help :-)
On 27/07/2013 14:15, Tim Streater wrote:
Well, only Our Dave knows whether the Z refers to the length of material that has unrolled from the sunroof (my interpretation) or refers to the horizontal distance extended (your interpretation). Either way, once you have the formula, no spreadsheet is needed. I just typed my formula straight into Google and it gave me the answer. If the extension is the horizontal reach, then it might be simpler to simply think of the slope as a rise in terms of "1 in 4" or similar... So a 2m extension translates as 0.5m rise at that going. -- Cheers, John. /================================================== ===============\ | Internode Ltd - http://www.internode.co.uk | |-----------------------------------------------------------------| | John Rumm - john(at)internode(dot)co(dot)uk | \================================================= ================/ |
Math help :-)
In article , Huge
scribeth thus On 2013-07-27, The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? Everything you need to know is in this article; http://en.wikipedia.org/wiki/Right_Angle_Triangle Yes fine but often it seems that Wikipedia goes into some complex maths rather too soon in the explain process. I 'm sure 'tho I can't remember it there is a very good site around that has a few worked out examples and shows you how those are done thats rather more educative than this one... -- Tony Sayer |
Math help :-)
On 27/07/2013 11:07, The Medway Handyman wrote:
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? This is the easy way (although the calculation isn't all that complicated) http://www.cleavebooks.co.uk/scol/calrtri.htm |
Math help :-)
in 1243759 20130727 110751 The Medway Handyman wrote:
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? If you've got an Android phone then I recommend this : https://play.google.com/store/apps/d...trianglesolver |
Math help :-)
On Sat, 27 Jul 2013 12:57:02 +0100, Dave W
wrote: I assume you mean 15 degrees below horizontal. "Depenfing on the width" - of what, measured how? I assume you measure the extension E down the sloping face, not horizontally. X=Y+Esin15 i.e. X=Y+(0.26 x E) Your example would be X=2.1 + 0.26x2, i.e. 2.62m If you can add the Y in your head, all you need to remember is that X is 0.26xE above Y. Even easier, as sin15 is pretty much 1/4 (and how accurate is your 15 anyway), X is E/4 higher than Y. -- Dave W |
Math help :-)
The Medway Handyman wrote:
An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? I am amazed that Unbeliever has not yet called you a **** for not knowing such things. -- Adam |
Math help :-)
On Sunday, 28 July 2013 15:32:07 UTC+1, wrote:
The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? I am amazed that Unbeliever has not yet called you a **** for not knowing such things. -- Adam Download a free copy of 'Sketchup' and draw it in that. It's the easiest draughting programme ever. You can check all the dimensions you like direct on the model |
Math help :-)
On 28/07/2013 15:32, ARW wrote:
The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? I am amazed that Unbeliever has not yet called you a **** for not knowing such things. Can't risk that when so far out of his depth himself... -- Cheers, John. /================================================== ===============\ | Internode Ltd - http://www.internode.co.uk | |-----------------------------------------------------------------| | John Rumm - john(at)internode(dot)co(dot)uk | \================================================= ================/ |
Math help :-)
On 28/07/2013 15:32, ARW wrote:
The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? I am amazed that Unbeliever has not yet called you a **** for not knowing such things. I'm amazed he hasn't called you a **** for knowing me. Perhaps he has pegged it at last. -- Dave - The Medway Handyman www.medwayhandyman.co.uk |
Math help :-)
On 27/07/2013 14:15, Tim Streater wrote:
In article , Ramsman wrote: On 27/07/2013 11:54, Tim Streater wrote: Well if it slopes 15deg then the angle it makes with the wall is 90-15 = 75deg. So if it extends out Z (which you say is 1m to 4m), then that's the hypotenuse of the triangle in which case the vertical height of the triangle is given by: H / Z = cos 75 So: H = Z * cos 75 But you said the front edge is up by 2.1m so that gives you: X = 2.1 + H or X = 2.1 + (Z * cos 75) if Z=2 then I type this into Google: 2.1 + (2 * cos (75 deg)) and it gives me 2.617.... No need for a spreadsheet at all. Here's the diagram . |\ | \ | \ | \ Z | \ |H \ | \ | \ | \ .---------. | | | | | 2.1 | | | My understanding is that 2m is the horizontal distance ('it extends out Z'), so it's different from that. |\ | \ | \ | \ | \ |X-Y \ | \ X| 15\ --------- | Z | | | Y | | | (X-Y)/Z = tan 15 . . . X = Y + Z (tan 15) Spreadsheet with Y in A1, Z in B1, then C1 is =A1+(B1*TAN(RADIANS(15))) which gives 2.64 for the given values. Well, only Our Dave knows whether the Z refers to the length of material that has unrolled from the sunroof (my interpretation) or refers to the horizontal distance extended (your interpretation). Either way, once you have the formula, no spreadsheet is needed. I just typed my formula straight into Google and it gave me the answer. Sorry, "Z" would be the fabric/hypotenuse. The 1 to 4 m would be the second longest side of the triangle, the third/shortest side of the triangle would be the height difference. Reason I was going to do a spreadsheet is so I could have a handy paper chart for site use. No Google involved. -- Dave - The Medway Handyman www.medwayhandyman.co.uk |
Math help :-)
On 28/07/2013 15:27, Dave W wrote:
On Sat, 27 Jul 2013 12:57:02 +0100, Dave W wrote: I assume you mean 15 degrees below horizontal. "Depenfing on the width" - of what, measured how? I assume you measure the extension E down the sloping face, not horizontally. No, horizontally. X=Y+Esin15 i.e. X=Y+(0.26 x E) Your example would be X=2.1 + 0.26x2, i.e. 2.62m If you can add the Y in your head, all you need to remember is that X is 0.26xE above Y. Even easier, as sin15 is pretty much 1/4 (and how accurate is your 15 anyway), X is E/4 higher than Y. I haven't explained this clearly enough. My bad. The awning is bolted to the wall & the front edge when extended, is lower. The canvas is at a 15 degree slope. In some cases the front of the awning has to be at a certain height to miss an obstacle. -- Dave - The Medway Handyman www.medwayhandyman.co.uk |
Math help :-)
On 27/07/2013 17:15, Farmer Giles wrote:
On 27/07/2013 11:07, The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? You can make up an Excel spreadsheet as follows: Put in awning front height - in metres - in column (say) D3 Then put the awning width (by that I mean front to back) - again in metres - in column D5 Then put the slope - in degrees - in column D7 Your final column, which will give the height of the rear of the awning, will need the following formula: =TAN(D7*PI()/180)*D5+(D3) Thanks - that seems to work! -- Dave - The Medway Handyman www.medwayhandyman.co.uk |
Math help :-)
On Mon, 29 Jul 2013 19:07:35 +0100, The Medway Handyman
wrote: On 28/07/2013 15:27, Dave W wrote: On Sat, 27 Jul 2013 12:57:02 +0100, Dave W wrote: I assume you mean 15 degrees below horizontal. "Depenfing on the width" - of what, measured how? I assume you measure the extension E down the sloping face, not horizontally. No, horizontally. X=Y+Esin15 i.e. X=Y+(0.26 x E) Your example would be X=2.1 + 0.26x2, i.e. 2.62m If you can add the Y in your head, all you need to remember is that X is 0.26xE above Y. Even easier, as sin15 is pretty much 1/4 (and how accurate is your 15 anyway), X is E/4 higher than Y. I haven't explained this clearly enough. My bad. The awning is bolted to the wall & the front edge when extended, is lower. The canvas is at a 15 degree slope. In some cases the front of the awning has to be at a certain height to miss an obstacle. As you liked Farmer Giles's solution, I now change my first solution to X = 0.27E above Y, where E now represents the horizontal distance of the front from the wall. -- Dave W |
Math help :-)
On 29/07/2013 19:12, The Medway Handyman wrote:
On 27/07/2013 17:15, Farmer Giles wrote: On 27/07/2013 11:07, The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? You can make up an Excel spreadsheet as follows: Put in awning front height - in metres - in column (say) D3 Then put the awning width (by that I mean front to back) - again in metres - in column D5 Then put the slope - in degrees - in column D7 Your final column, which will give the height of the rear of the awning, will need the following formula: =TAN(D7*PI()/180)*D5+(D3) Thanks - that seems to work! Glad to help. I'd be grateful if you could now do me a favour. Please call it 'maths', and not the irritating Americanism 'math'. |
Math help :-)
On 30/07/2013 16:13, Farmer Giles wrote:
On 29/07/2013 19:12, The Medway Handyman wrote: On 27/07/2013 17:15, Farmer Giles wrote: On 27/07/2013 11:07, The Medway Handyman wrote: An awning is attached to a wall at a height "X". The front edge is lower because the awning slopes by 15 degrees. Depending on the width, the awning could extend by anything from 1m to 4m. If I want the front edge at a specific height "Y", what would distance "X" be? I want to make up a spreadsheet to calculate this for any height "Y" and any extension. So, if the client wants the front of the awning 2.1m off the ground and it extends 2m, how high would "X" be? You can make up an Excel spreadsheet as follows: Put in awning front height - in metres - in column (say) D3 Then put the awning width (by that I mean front to back) - again in metres - in column D5 Then put the slope - in degrees - in column D7 Your final column, which will give the height of the rear of the awning, will need the following formula: =TAN(D7*PI()/180)*D5+(D3) Thanks - that seems to work! Glad to help. I'd be grateful if you could now do me a favour. Please call it 'maths', and not the irritating Americanism 'math'. I stand corrected :-) -- Dave - The Medway Handyman www.medwayhandyman.co.uk |
Math help :-)
The Medway Handyman wrote:
On 28/07/2013 15:27, Dave W wrote: On Sat, 27 Jul 2013 12:57:02 +0100, Dave W wrote: I assume you mean 15 degrees below horizontal. "Depenfing on the width" - of what, measured how? I assume you measure the extension E down the sloping face, not horizontally. No, horizontally. X=Y+Esin15 i.e. X=Y+(0.26 x E) Your example would be X=2.1 + 0.26x2, i.e. 2.62m If you can add the Y in your head, all you need to remember is that X is 0.26xE above Y. Even easier, as sin15 is pretty much 1/4 (and how accurate is your 15 anyway), X is E/4 higher than Y. I haven't explained this clearly enough. My bad. The awning is bolted to the wall & the front edge when extended, is lower. The canvas is at a 15 degree slope. In some cases the front of the awning has to be at a certain height to miss an obstacle. When I helped fit the awning at my parents house I let my Dad "borrow" the SDS drill that I bought him for Christmas:-) -- Adam |
Math help :-)
On 30/07/2013 16:13, Farmer Giles wrote:
I'd be grateful if you could now do me a favour. Please call it 'maths', and not the irritating Americanism 'math'. cough This is arithmetic. Andy |
Math help :-)
In article , Vir Campestris
writes On 30/07/2013 16:13, Farmer Giles wrote: I'd be grateful if you could now do me a favour. Please call it 'maths', and not the irritating Americanism 'math'. cough This is arithmetic. Not trigonometry then B-) -- fred it's a ba-na-na . . . . |
Math help :-)
On 30/07/2013 22:03, Vir Campestris wrote:
On 30/07/2013 16:13, Farmer Giles wrote: I'd be grateful if you could now do me a favour. Please call it 'maths', and not the irritating Americanism 'math'. cough This is arithmetic. Andy cough Trigonometry is maths. The final calculation is arguably arithmetic, but the process that defined the calculation is definitely mathematics. |
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