Q: use a geometry formula to find the exact value of the definite integral (x/2 +3)dx on interval[-2,4]
A: To calcute the value of the definite integral ,using geometric consideration (ie. without using…
Q: Vx2-a²
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Q: S cosh? 2x sinh² 2x dx
A: This question is based on indefinite integral.
Q: Q3. Use tabular integration by parts to evaluate the following Integral (x² +x+ 1) sin x dx
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Q: 2 sinh x 2. Calculate the integral, dx. 5+6 cosh x
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Q: Find the indefinite integral. (Use C for the constant of integration.) sin3 50 cos 50 de
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Q: Evaluate the integral / 8 cos (x) sin(2x) dx Note: Use an upper-case "C" for the constant of…
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Q: Find the indefinite integral. (Use C for the constant of integration.) sin3 40 cos 40 de
A: Given: you can solve this question using substitution.
Q: Evaluate the indefinite integral. (Use C for the constant of integration.) sin(2x) cos?(x) 45 + coS
A: we know the trigonometric identitycos2x=2cos2x-1cos2x=1+cos2x2I=∫sin2x45+cos2xdxreplace value in the…
Q: Find the indefinite integral. (Use C for the constant of integration.) sin3 30 v cos 30 de
A: Integrate by substitution
Q: Evaluate the integral. (Use C for the constant of integration.) cos3 sin2 dt
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Q: Find the trigonometric integral. (Use C for the constant of integration.) (cos(20))(sin(0) +…
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Q: Evaluate the indefinite integral. (Use C for the constant of integration.) | sec?(e) tan7(0) do
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Q: Find the indefinite integral. (Use C for the constant of integration.) sin3 20 cos 20 de
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Q: Evaluate the integral. (Use C for the constant of integration.) fu- (x – 3)sin(Tx) dx
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Q: 75. Evaluate / sin x In(sin x) dx. Hint: Use Integration by Parts as a first step.
A: Let,
Q: Evaluate the indefinite integral. (Use C for the constant of integration. sin(2x) sin(cos(2x)) dx
A: To evluate: I=∫sin(2x) sin(cos(2x)) dx...(1)
Q: 2. Evaluate x sin xdr using integration by parts.
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Q: Complete the integration: 1 1 Scos (2x)dx = sin 2x -sin 2x + C Determine the value of "?".
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Q: Evaluate the indefinite integral. (Use C for the constant of integration.) | sin(76) sec (cos(7)) dt
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Q: Find the indefinite integral. (Use C for the constant of integration.) sin3 30 V cos 30 de
A: Given integral is ∫ sin33θcos3θdθ
Q: Evaluate the integral. (Use C for the constant of integration.) 10 sin(2x) dx 1 + cos“(x)
A: Answer is -10arctan(cos^2x)+C.
Q: Evaluate the integral sin(-1t) dt Note: Use an upper-case "C" for the constant of integration.
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Q: Find the indefinite integral. (Use C for the constant of integration.) S sin(3æ) sin(2x)da O +(3…
A: we have to use 2sin A sin B = cos(A-B)-cos(A+B) And solve the integration.
Q: Evaluate the integral -21 cos(-2t) dt Note: Use an upper-case "C" for the constant of integration.
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Q: Evaluate the integral | -3(1 – tan?(x)) sec2 (x) dx Note: Use an upper-case "C" for the constant of…
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Q: Evaluate the integral -2t sin(-3t) dt Note: Use an upper-case "C" for the constant of integration.
A: Given Integral;
Q: 9. Using integration by parts, evaluate fe* sin 3x dx.
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Q: Use integration tables to find or evaluate the integral ∫ 1 / sin x cos x dx
A: We have to evaluate the integral: ∫1sin x cos xdx We know the identity: sin2x+cos2x=1 Substituting…
Q: use a geometry formula to find the exact value of the definite integral. 5 dx on interval[-2,6]
A: Question is to find the exact value of the definite integral 5dx in the interval [-2 , 6 ]It is…
Q: Use the Table of Integrals to evaluate the integral. (Use C for the constant of integration.) 2et…
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Q: Evaluate the integral. (Use C for the constant of integration.) 9 cos5(x) sin*(x) dx
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Q: Using integration, derive the La L(sinh at)
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Q: Use an appropriate u-substitution to evaluate the indefinite integral 3sin (71)cos(7)dt. Use C'for…
A: Use substitutions to integration
Q: Find th Integral. for the constant of Integration. |(7 cos(x) – 2 sec?(x)) dx
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Q: Use integration by parts to evaluate the integral: ∫e^2r sin(−2r)dr
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Q: Evaluate the indefinite integral. (Use C for the constant of integration.) sin (5x) J1+ (cos (52))…
A: Here we have to evaluate I=∫sin(5x)1+(cos(5x))2dx
Q: s) to simplify the integration, then find the integration within limits (0-1), discus
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Q: a) Evaluate the indefinite integrals using Tabular Integration by parts. i) S(x² +x + 1)Sinxdx
A: Given: The integral ∫(x2+x+1) sin(x) dx
Q: Use the Table of Integrals on the Reference Pages toevaluate the integral.
A: ∫cosx4+sin2x dx Put, sinx=t⇒cosx=dtdx⇒cosx dx=dt
Q: 7 sin(4) do cos (4) CoS
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Q: Find the indefinite integral. (Use C for the constant of integration.) sin x xp- 7 + cos? x
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Q: Evaluate the integral. (Use C for the constant of integration.) 9 sin(2x) dx 1 + cos“(x)
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Q: efsin (In sin (Inx) dx. Integration by parts will be used repeatedly. What is the expression after…
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Q: Em hake 3 an
A: We can find the integral as below
Q: Evaluate the integral | 2 cos(In(x)) dx, x > 0 Note: Use an upper-case "C" for the constant of…
A: Given information: The integral is ∫ 2coslnxdx. Concept used: Integration by parts: ∫udv=uv-∫vdu…
Q: Use integration by parts to evaluate the integral: sin( – 8r)dr - 05 e-r(sin(-8r) - 8 cos (-8r)) + C
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Q: Evaluate the integral. (Use C for the constant of integration.) cos(x) (4 + 8 sin²(x)) dx
A: Solve the intregal
Q: Which of the following leads to trigonometric integral formula of integration? cscx sin2xdx (…
A: Given, Which of the following leads to trigonometric integration formula for integration:
Q: Evaluate the indefinite integral. (Use C for the constant of integration.) sin(6x) sin(cos(6x)) dx
A: In this question we have to evaluate the integral.
Evaluate using trignometric
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- The grades of a sample of 9 students on a prelim exam (x) and on the midterm exam (y) are shown in the excel worksheet. Predict the midterm grade if the prelim grade is 85.The article “Determination of Most RepresentativeSubdivision” (J. of Energy Engr., 1993: 43–55) gavedata on various characteristics of subdivisions that couldbe used in deciding whether to provide electrical powerusing overhead lines or underground lines. Here are thevalues of the variable x 5 total length of streets within asubdivision:1280 5320 4390 2100 1240 3060 47701050 360 3330 3380 340 1000 9601320 530 3350 540 3870 1250 2400960 1120 2120 450 2250 2320 24003150 5700 5220 500 1850 2460 58502700 2730 1670 100 5770 3150 1890510 240 396 1419 2109a. Construct a stem-and-leaf display using the thousandsdigit as the stem and the hundreds digit as theleaf, and comment on the various features of thedisplay.b. Construct a histogram using class boundaries 0, 1000,2000, 3000, 4000, 5000, and 6000. What proportion of subdivisions have total length less than 2000?Between 2000 and 4000? How would you describethe shape of the histogram?According to the National Center for Health Statistics (2004), 22.4% of adults are smokers. A random sample of 300 adults is obtained. Subquestion: What would the minimum number of adults need to be in order to ensure the sampled values are independent of each other?
- Please SOLVE On paper this Prob stat problemPeople come to relationships with different attachment styles that partially stem from the attachments they experienced with the adults raising them and partially due to experiences in other relationships in their lives. Those who have what is known as “secure” attachments are comfortable with their partners emotions, can help soothe, and make movements towards the other person in a responsive way. Among a group of 10 individuals rated as having a secure attachment style, a researcher wanted to know if, as they were first being acquainted with another person, the amount of self-disclosure made them like their person more. The data is listed in Table 6 below. Test the hypothesis at an alpha of 0.05 (where increasing scores mean higher disclosure and higher liking). If you knew the new person you are about to go on a date with had a self-disclosure rating of 4, what would you predict your likeability score would be (provide the full regression formula as well as the response)? -use…People come to relationships with different attachment styles that partially stem from the attachments they experienced with the adults raising them and partially due to experiences in other relationships in their lives. Those who have what is known as “secure” attachments are comfortable with their partners emotions, can help soothe, and make movements towards the other person in a responsive way. Among a group of 10 individuals rated as having a secure attachment style, a researcher wanted to know if, as they were first being acquainted with another person, the amount of self-disclosure made them like their person more. The data is listed in Table 6 below. Test the hypothesis at an alpha of 0.05 (where increasing scores mean higher disclosure and higher liking). If you knew the new person you are about to go on a date with had a self-disclosure rating of 4, what would you predict your likeability score would be (provide the full regression formula as well as the response)? Table 6.…
- I want example of last-come first-served (LCFS)Explain the role of the first GLS assumption?The Goodman Tire and Rubber Company periodically tests its tires for tread wear under simulated road conditions. To study and control the manufacturing process, 20 samples, each containing three radial tires, were chosen from different shifts over several days of operation, the data collected are shown below. Assuming that these data were collected when the manufacturing process was believed to be operating in control, develop the R and x bar charts. Click on the datafile logo to reference the data. Use Table 19.3. R Chart: (to 2 decimals). If your answer is zero enter “0”. UCL= LCL= x bar Chart: (to 1 decimal) UCL= LCL=