Introduction to false negative definition: The false negative definition is also called as argument.This argument may true or false,but here no one can say that the given argument is vald or in valid.Then the solving of some statement conclusion should be valid or invalid.Here we are going to see some false negative definition in upcomming paragraphs. Some false negative definition The false negative definition are follows below: Calculate and find the answer for the following arguments? Example 1: This problem will be false negative definition. Every tiger plays football. Reasoning for conclusion: There is no tiger that plays foot ball Example 2: Calculate and find the answer for the following question in false negative definition ? All oranges are fruits All the oranges grow on the trees Reasoning for conclusion So, all oranges grow on the trees Some false negative definition of math problems Problem 1: The sequences values are 12, 14, 16, 18, P, Q.Calculate and find the values for P and Q by using the types of false negative definition Solution: Step 1: In step one we have calculate the difference value Step 2: Difference value = second term – first term =14 – 12 = 2 Step3:Now we can add the difference value with last value means we can identify the values for P and Q. That is P = 18 + 2 = 20 Q= 20 +2 = 22 Step 4: The answer for P = 20 The answer for Q = 22 Problem 2: Solve the given problem 2+ 3 ( 6 + 6) ÷ 12 – 6 in method of order of operation Solution: Given: `=>`2+ 3 ( 6 + 6) ÷ 12 – 6 Step 1: simplify the parenthesis first we get, `=>` 2 + 3 `xx` 12 ÷ 12 – 6 Step 2:simplify the multiplication means we get, `=>` 2 + 36 ÷ 12 – 6 Step 3: simplify the division means we get, `=>` 2+ 3 – 6 Step 4: simplify the addition means we get, `=>` 5 – 6 Step 5: simplify the subtraction means we get, `=>` `-` 1 Answer: 2+ 3 ( 6 + 6) ÷ 12 – 6 = `-` 1. In this article we are going to see How the find relative maximum ? The difference between relative maximum and minimum is a small. The necessary condition for a point to be a relative maximum or minimum is that it should lie in some interval of x’s around x=c. There may be better or lesser values of the function at some other place, but relative to x=c or local to x=c, f(c) is larger or smaller than all the other function values that are near it. The small point of a particular section of a graph following figure show the find relative maximum process. relative maximum Example problem to find relative maximum:- Ex:1 Find relative maximum - problem:- Find the relative maximum and relative minimum of the function f (x) = 2x3 - 21x2 + 36x - 20. Find the relative maximum values. Sol:- f '(x) = 6x2 - 42x + 36 f '(x) = 0 => 6x2 – 42x +36 = 0 => 6(x2 – 7x +6) = 0 => 6(x-1)(x-6) = 0 => x = 1 and x = 6 are the critical values f '(x) =12x - 42 If x =1, f '(1) =12 - 42 = - 30 < 0 =>x =1 is a point of relative maximum of f (x). Maximum value = 2(1)3 - 21(1)2 + 36(1) - 20 = -3 If x = 6, f '(6) = 72 - 42 = 30 > 0 =>x = 6 is a point of relative minimum of f (x) Minimum value = 2(6)3 - 21 (6)2 + 36 (6)- 20 = -128. Case problem for find relative maximum:- Ex:2 Find relative maximum - problem:- Find the relative maximum and relative minimum of the function f (x) = x3 - 15x2 +48x - 20. Find the relative maximum values. Sol:- f '(x) = 3x2 - 30x + 48 f '(x) = 0 => 3x2 – 30x +48 = 0 => 3(x2 – 10x +16) = 0 => 3(x-8)(x-2) = 0 => x = 8 and x = 2 are the critical values f '(x) =6x - 30 If x =1, f '(1) =6 - 30 = - 24 < 0 =>x =8 is a point of relative maximum of f (x). Maximum value = (8)3 - 15(8)2 + 48(8) - 20 = -84 If x = 6, f '(2) = 12 - 30 = -18 > 0 =>x = 6 is a point of relative minimum of f (x) Minimum value = (2)3 - 15 (2)2 + 48 (2)- 20 = 24. Learn more on aboutword problem solver algebra and its Examples. Between, if you have problem on these topics how to factor polynomials completely step by step, please browse expert math related websites for more help.Please share your comment
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