WebAug 15, 2024 · The answer to the expression is -5.Substitute the values of all the variables into the expression.x+y+z2+(-3)+(-4)-1+(-4)-5. Brainly User Brainly User ... Mathematics High School answered Evaluate x + y + z for x = 2, y = -3, z = -4. 9-9-5 5 See answer Advertisement Advertisement st4rgrl st4rgrl The answer to the expression is -5. … WebSolve for x (x+y)/3=5. Step 1. Multiply both sides of the equation by . Step 2. Simplify both sides of the equation. Tap for more steps... Step 2.1. Simplify the left side. Tap for more steps... Step 2.1.1. Cancel the common factor of . Tap for more steps... Step 2.1.1.1. Cancel the common factor. Step 2.1.1.2.
Answered: 6. Evaluate the iterated integral ² ²³… bartleby
WebNov 30, 2024 · Evaluate x(y+3)/(3+y)z for x=6 y=9 z=2 - 14022562. gabbygoodman22 gabbygoodman22 11/30/2024 Mathematics College ... 6(9+3)/(3+9)2. After you set it up like this you have to get rid of the parentheses by multiplying the outside number to the numbers in the parentheses. So do: 6×9=54, then 6×3=18 so now your problem should look like … WebSep 14, 2012 · The compiler may choose to evaluate --y * b / a before evaluating x++. The compiler may choose to defer applying the side effects to x++ and --y until after the assignment of the result to z. ... int z, x=5, y=-10 ,a=4, b=2; z = x++ - --y * b / a; y = --y y = -11 z = 5 - -11 * 2 / 4 z = 5 - -22 / 4 z = 5 - -5 z = 10 x = 5++ x = 6 ... paleolithic prescription
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WebEvaluate the double integral ∬ D 6 x y d A, where D is the triangular region with vertices (0, 0), (1, 2), and (0, 3). Answer: Previous question Next question. This problem has been solved! You'll get a detailed solution from a subject matter … WebThen type x=6. Try it now: 2x+3=15 @ x=6 Clickable Demo Try entering 2x+3=15 @ x=6 into the text box. After you enter the expression, Algebra Calculator will plug x=6 in for the equation 2x+3=15: 2(6)+3 = 15. The calculator prints "True" to let you know that the answer is right. More Examples WebJul 29, 2015 · 1. Switching to polar coordinates, the Jacobian is given by J where. J = ∂ ( x, y) ∂ ( r, θ) = ∂ x ∂ r ∂ y ∂ r ∂ x ∂ θ ∂ y ∂ θ = cos θ sin θ − r sin θ r cos θ = r. Therefore, your double integral is given by. ∬ R ( x 2 + y 2) d x d y = ∫ π / 4 3 π / 4 ∫ 0 2 ( ( r cos θ) 2 + ( r sin θ) 2) J ... summer waves 15 ft round pool