Use the properties of operations and the rules for multiplying and dividing to solve v(-2)×(1-5)÷(2-3)×(-5-6(÷(3-4)
To solve this expression, we will follow the order of operations, which is parentheses, exponents, multiplication, division, addition, and subtraction (PEMDAS).
v(-2) × (1-5) ÷ (2-3) × (-5-6 ÷ (3-4))
First, let's simplify the expression inside the innermost parentheses:
v(-2) × (-4) ÷ (2-3) × (-5-6 ÷ (3-4))
Then, let's simplify the division inside the parentheses:
v(-2) × (-4) ÷ (2-3) × (-5-6 × -1)
Now, let's simplify the multiplication inside the parentheses:
v(-2) × (-4) ÷ (2-3) × (-5+6)
Next, let's simplify the subtraction inside the parentheses:
v(-2) × (-4) ÷ (-1) × 1
Now, let's simplify the multiplication:
-4v ÷ (-1) × 1
Since (-1) × 1 is just -1, we have:
-4v ÷ (-1)
Finally, simplifying the division:
4v
So, the final answer is 4v.
To solve the expression v(-2)×(1-5)÷(2-3)×(-5-6(÷(3-4)), let's follow the order of operations (PEMDAS/BODMAS) and simplify step by step:
Step 1: Simplify the innermost parentheses or brackets:
(-2) × (1 - 5) ÷ (2 - 3) × (-5 - 6 ÷ (3 - 4))
(-2) × (-4) ÷ (2 - 3) × (-5 - 6 ÷ (3 - 4))
Step 2: Simplify the next inner parentheses or brackets:
(-2) × (-4) ÷ (-1) × (-5 - 6 ÷ (3 - 4))
Step 3: Divide (-2) × (-4) by (-1):
8 ÷ (-1) × (-5 - 6 ÷ (3 - 4))
Step 4: Simplify (-5 - 6 ÷ (3 - 4)):
8 ÷ (-1) × (-5 - 6 ÷ (-1))
Step 5: Divide 8 by (-1):
-8 × (-5 - 6 ÷ (-1))
Step 6: Simplify (-5 - 6 ÷ (-1)):
-8 × (-5 - 6)
Step 7: Perform the subtraction inside the parentheses:
-8 × (-11)
Step 8: Multiply -8 by -11:
88
Therefore, the solution to the expression v(-2)×(1-5)÷(2-3)×(-5-6(÷(3-4) is 88.