Why it is not possible to draw a triangle whose side are 7 cm 6 cm and 16 cm
Answers
Answer:
because 6 + 7 < 16
(sum of any two sides should be more than the third side)
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7+6 <16 , it is not possible to draw a triangle whose side are 7 cm 6 cm and 16 cm
Step-by-step explanation:
condition:
The triangle inequality states that the sum of the lengths of any two sides of a triangle must be greater than or equal to the length of the third side. ... It is not possible for that sum to be less than the length of the third side.
here ,
sides are 7 cm, 6 cm and 16 cm
therefore
7+6 <16 ...not greater
7+16 >6 .... greater
6+16 >7 ....greater
since , 7+6 is less than 1.. it is not possible
say you have rods measuring 6cm, 7cm, and 16cm...the longest one is hinged to the shortest one at one end, and to the middle-size rod on the other end. To make a triangle, you need to fold those 6cm and 7cm rods until their open ends meet. But they can't: together, 6+7=13. They'll fold flat against the 16cm rod, and still have a 3 cm gap between them.
hence ,
It is not possible to draw a triangle whose side are 7 cm 6 cm and 16 cm
#Learn more:
In a triangle ABC and triangle =5 triangle ACB and triangle BAC=3 triangle ACB then triangle ABC =?
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