Evaluate the following :
`-346-(-1275)`

To evaluate the expression \(-346 - (-1275)\), we can follow these steps: ### Step 1: Rewrite the expression We start with the expression: \[ -346 - (-1275) \] According to the rules of integers, subtracting a negative number is the same as adding its positive counterpart. Therefore, we can rewrite the expression as: \[ -346 + 1275 \] ### Step 2: Perform the addition Now we need to add \(-346\) and \(1275\). To do this, we can think of it as: \[ 1275 + (-346) \] This means we are adding a negative number to a positive number. We can find the difference between the two absolute values and then apply the sign of the larger absolute value. ### Step 3: Calculate the difference First, we will calculate the difference between \(1275\) and \(346\): \[ 1275 - 346 \] ### Step 4: Perform the subtraction Now, let's perform the subtraction step by step: - Start from the rightmost digit: \(5 - 6\) requires borrowing, so we take \(1\) from the \(7\) (making it \(6\)) and add \(10\) to \(5\), which becomes \(15\). Thus, \(15 - 6 = 9\). - Next, we have \(6 - 4 = 2\). - Finally, \(12 - 3 = 9\) (after borrowing). Putting it all together, we have: \[ 1275 - 346 = 929 \] ### Step 5: Determine the sign of the result Since \(1275\) is greater than \(346\), the result will be positive. Therefore, we conclude: \[ -346 + 1275 = 929 \] ### Final Answer The final answer is: \[ \boxed{929} \] ---