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merven
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THE AREA OF A SQUARE WITH SIDE LENGTHS EQUAL TO THE DEFINITE INTEGRAL OF (0.43890022*X) FROM 1 TO 10
please help me...
Merven
please help me...
Merven
merven said:omg if that trully is the answer, i got it right when i used one fo the calculators. but double guessed and threw it out since i had no clue. lol wow steven10137 you are my hero... lol now i have to see what he says, ill come back and post his reply :) thanks a million guys
Merven
A definite integral is a mathematical concept used to find the area under a curve between two specific points on the x-axis. It involves summing up infinitely small rectangles to approximate the area of the curve.
A definite integral has specific limits of integration, which means it will give a specific numerical value as the result. An indefinite integral does not have limits of integration, and therefore gives a general formula for the area under a curve.
A definite integral is evaluated using the fundamental theorem of calculus, which states that the integral of a function is equal to the difference between its antiderivative evaluated at the upper and lower limits of integration.
Definite integrals have various applications in real life, such as calculating the distance traveled by an object with varying velocity, finding the total cost of a product with changing prices, and determining the average value of a function over a given interval.
Yes, definite integrals can have negative values. This occurs when the area under the curve is below the x-axis, and the integral will give a negative value as a result. This can represent quantities such as negative displacement or negative profit.