Find the rule, which gives the number of matchsticks required to make matchstick pattern of
letter E as E Use a variable to write the rule
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Step-by-step explanation:
= 2n (as two matchstick used in each letter) ...
= 2n (as two matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...
= 2n (as two matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...
= 2n (as two matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 2n (as two matchstick used in each letter) ...
= 2n (as two matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 2n (as two matchstick used in each letter) ...= 5n (as five matchstick used in each letter) ...
= 2n (as two matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 2n (as two matchstick used in each letter) ...= 5n (as five matchstick used in each letter) ...= 5n (as five matchstick used in each letter) ...
= 2n (as two matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 3n (as three matchstick used in each letter) ...= 2n (as two matchstick used in each letter) ...= 5n (as five matchstick used in each letter) ...= 5n (as five matchstick used in each letter) ...= 6n (as six matchstick used in each letter)
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