PLEASE ANSWER THE QUESTION ACCORDING TO INTERVAL NOTATION. AND PLEASE WRITE THE ANSWERS AT THE END TOGETHER

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Answer the following questions for the function defined on the interval [-6.18, 0.57]. Remember that you can enter pi for π as part of your answer. -3-л a.) f(x) is concave down on the region(s) 2 2 f(x) = = sin² (-1/2) b.) A global minimum for this function occurs at (-π,1)) c.) A local maximum for this function which is not a global maximum occurs at ((0.57,0.079) d.) The function is increasing on the region(s) (-6.18, -π) U (0, 0.57) Note: In some cases, you may need to give a comma-separated list of intervals, and intervals should be given in interval notation. Using Interval Notation ■ If an endpoint is included, then use [ or ]. If not, then use ( or ). For example, the interval from -3 to 7 that includes 7 but not -3 is expressed (-3,7]. ■ For infinite intervals, use Inf for ∞ (infinity) and -Inf for - (-Infinity). For example, the infinite interval containing all points greater than or equal to 6 is expressed [6, Inf). ■ If the set includes more than one interval, they are joined using the union symbol U. For example, the set consisting of all points in (-3,7] together with all points in [-8,-5) is expressed [-8,-5) U(-3,7]. ■ If the answer is the empty set, you can specify that by using braces with nothing inside: { } ■ You can use R as a shorthand for all real numbers. So, it is equivalent to entering (-Inf, Inf). ■ You can use set difference notation. So, for all real numbers except 3, you can use R-{3} or (-Inf, 3) U(3, Inf) (they are the same). Similarly, [1,10)-{3,4} is the same as [1,3)U(3,4)U(4,10). ■ WeBWorK will not interpret [2,4] U[3,5] as equivalent to [2,5], unless a problem tells you otherwise. All sets should be expressed in their simplest interval notation form, with no overlapping intervals.