Actions

Seeing is Believing!

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Revision as of 09:47, 8 February 2016 by DT Online (talk | contribs) (Added Category)
Kitchen1.png

Try this activity and see for yourself that drawing in perspective really does produce a 'camera's eye view' of the world - indeed the use of a Camera Obscura to create perspective drawings has been known about for centuries and is thought to have been used by some famous artists.


You will need to search colour brochures and magazines or use the Internet (e.g. using Google Images) to find a photograph of a room interior viewed from 'head on'.


See kitchen example opposite. See also YouTube video of a robot which uses vanishing points for navigation.


Choose the method you wish to use from the following:



Using a photo cut out from a magazine or catalogue
Corridor5.png


Step 1 Look through magazines and catalogues to find a picture which is viewed from straight on - a room interior for example. Try to choose one that is as uncluttered as possible and has clearly defined edges that seem to run into the picture. The edges of any surfaces you are looking straight at should be vertical and horizontal - see opposite.


Safety Point! Use a Cutting Mat and a metal Safety Ruler when using a knife.


Corridor4.png

Step 2 Paste the cut-out on to a sheet of drawing paper and use a felt tip pen or similar to draw along the lines that appear to go into the picture - see opposite.


Note: The point at which all the lines appear to meet is called the Central Vanishing Point or CVP



Safety Point! If you use a spray adhesive, make sure you do it in an Air Filtration Cabinet.


Question: Were you able to draw lines that meet at a single point, at least approximately?



Using an image from the Internet
Passageway3.png


Step 1 Search the Internet to find a picture which is viewed from straight on - such as a room interior.


Try to choose one that is as uncluttered as possible and has clearly defined edges that seem to run into the picture. The edges of any surfaces you are looking straight at should be vertical and horizontal - see opposite.


Try search for passageway in Google Images or corridor in Wikimedia Commons - can you think of any other words that might produce good results? What do they call corridors in monasteries for example?


Note: You should always seek permission if you intend making public other people's images, e.g. go to the Advanced Search page in Google Images and scroll down to see usage rights where you can choose a suitable setting. Alternatively search for images from Creative Commons - but you may still need to check with the owner!


Xara.jpg

Step 2 Hover over the image then right mouse click to select the 'Save Image As...' option from the menu.


Save the image somewhere on your disc that you will remember!


Load your favourite illustration software and draw along the lines that appear to go into the picture - see opposite (this was created using XaraX).


Note: The point at which all the lines appear to meet is called the Central Vanishing Point or CVP


Question Were you able to draw lines that meet at a single point, at least approximately?



Using a scanner or camera
DaleHall1.png


Step 1 Look through magazines and catalogues to find a picture which is viewed from straight on - a room interior for example. You could also use a photo you have taken yourself, either from print or directly from your digital camera.


Try to choose one that is as uncluttered as possible and has clearly defined edges that seem to run into the picture. The edges of any surfaces you are looking straight at should be vertical and horizontal - see opposite.


DaleHall2.png

Step 2 Place the image into your scanner and scan, alternatively, load the image directly from your digital camera.


Save the image somewhere on your disc that you will remember!


Load your favourite illustration software and draw along the lines that appear to go into the picture - see opposite (this was created using XaraX).


Note: The point at which all the lines appear to meet is called the Central Vanishing Point or CVP


Question Were you able to draw lines that meet at a single point, at least approximately?