Question

Using suitable identity, find the value of: 612 - 592

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Answer 1

Answer:

360100

Step-by-step explanation:

612 - 592

(x+a) (x+b) = x^2+(a+b)x+ab

(600+12)(600-8)=600^2+4+96

360000+4+96

360100

Answer 2

In accordance with the information provided in the question,

We have find the value of the supplied expression in the above question.

Given the data in question 612 - 592

The rule of subtraction is inextricably linked to two key aspects of probability: A sample point's probability ranges from 0 to 1. In a sample space, the total of all sample points' probabilities equals 1.

We get ,

$=(600+12)-(600-8)\\=>600+12-600+8\\=>12+8\\=>20$

Hence the required value will be $20.$