To evaluate the expression a+b4, where a=2 and b=3, we can substitute the given values into the expression and simplify.
a + b4 = 2 + 3(4)
= 2 + 12
= 14
Therefore, when a=2 and b=3, the value of a+b4 is 14.
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a + b4 = 2 + 3(4)
= 2 + 12
= 14
Therefore, when a=2 and b=3, the value of a+b4 is 14.
To evaluate a+b4 where a=2 and b=3, we substitute the given values into the expression:
a + b4 = 2 + 3(4)
= 2 + 3(4)
= 2 + 12
= 14
Therefore, when a=2 and b=3, the value of a+b4 is 14.
To evaluate a+b^4, where a=2 and b=3, we substitute the given values into the expression:
a + b^4 = 2 + 3^4
= 2 + 81
= 83
Therefore, when a=2 and b=3, the value of a+b^4 is 83.
6รท3โ
2โ5+7โ
2 can be simplified as:
6 รท 3 = 2
2 โ
2 = 4
7 โ
2 = 14
Now we rewrite the expression with the simplified values:
2 โ
4 - 5 + 14
Performing the operations from left to right:
8 - 5 + 14 = 7 + 14 = 21
Therefore, the simplified value of 6รท3โ
2โ5+7โ
2 is 21.
To simplify the expression 6รท3โ
2โ5+7โ
2, we follow the order of operations, also known as PEMDAS (parentheses, exponents, multiplication and division from left to right, and addition and subtraction from left to right).
6 รท 3 = 2
2 โ
2 = 4
7 โ
2 = 14
Now we rewrite the expression with the simplified values:
4 - 5 + 14
Performing the operations from left to right:
4 - 5 + 14 = -1 + 14 = 13
Therefore, the simplified value of 6รท3โ
2โ5+7โ
2 is 13.