verify the identity (a+b)³=a³+b³+3a²b+3b²a
Answers
Answered by
6
Answer:bro for that you have to do a experiment with a cube you can do it by derivation also
Step-by-step explanation:
Volume of Arrangement 1
Volume of the stack in Figure 6.1 = (a+b)³.
volume of Arrangement 1 of the cubes =(a+b)³.
Volume of Arrangement 2
Volume of Stack I [stack in Figure 6.2(a)] = a³.
Volume of each of Stacks II, III and IV = a²b.
total volume of the three stacks [shown in Figure 6.2(b)] = 3a²b.
Volume of each of Stacks V, VI and VII = ab².
total volume of the three stacks [shown in Figure 6.2(c)] = 3ab².
Volume of Stack VIII =b³.
Thus, total volume of Arrangement 2 of the cubes = a³ + 3a²b + 3ab² +b³.
Since the total volume in the two arrangements must be the same,
therefore
(a+b)³ =a³ + 3a²b + 3ab² +b³.
Similar questions