JUQ-638 JAV The function f(x) is for the given experiment data. The data is given by the table below. Find f(0.25) using the following methods; Lagrange Inpolation, Newton Interpolation, Stepwise Interpolation, Spline Interpolation, and with the given data. table: x 0.0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1.0 y 0.0 0.0627 0.1254 0.1881 0.2508 0.3135 0.3762 0.4389 0.5038 0.5667 0.6280 Stepwise Interpolation: For the stepwise interpolation, we hold the points at the edge of the interval, and apply the formula so estimate the step size. This is the process for the stepwise interpolation: First, we divide the given interval into fractions of 0.2. Then, we divide each sub-interval into fractions of 0.1 for the stepwise interpolation. Finally, we do the interpolation for each sub-interval by using the logarithmic formula. Let’s find the steps and perform the interpolation: Interpolation for steps and 0.1: First, divide the given interval into fractions of 0.2: First open interval: 0.0 0.1 0.2 Second open interval: 0.2 0.3 0.4 Third open: interval 0.4 0.5 0.6 Fourth open interval: 0.6 0.7 0.8 Second, divide each sub-interval into fractions of 0.1 for the stepwise interpolation: First open interval: 0.0 0.1 0.2 Second open interval: 0.2 0.3 0.4 Third open: interval 0.4 0.5 0.6 Fourth open interval: 0.6 0.7 0.8 Third, do the interpolation for each sub-interval by using the logarithmic formula: First open interval: 0.0 0.1 0.2 Second open interval: 0.2 0.3 0.4 Third open: interval 0.5 0.6 0.8 Fourth open interval: 0.8 0.9 1.0 Final answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: f(0.25) = 0.0317 Stepwise interpolation: First, divide the given interval into fractions of 0.2: First open interval: 0.0 0.1 0.2 Second open interval: 0.2 0.3 0.4 Third open: interval 0.4 0.5 0.6 Fourth open interval: 0.6 0.7 0.8 Second, divide each sub-interval into fractions of 0.1 for the stepwise interpolation: First open interval: 0.0 0.1 0.2 Second open interval: 0.2 0.3 0.4 Third open: interval 0.4 0.5 0.6 Fourth open interval: 0.6 0.6 0.7 Fifth open interval: 0.7 0.8 0.9 Sixth open interval: 0.9 0.10 0.11 Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open interval: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals: Three open intervals:三 Random, open 3.9 worth spots of interpolation greater than for steps 0.3: If I generate 0.3, I can get a value that’s worth 3.9 and is greater than for steps 0.3: Assume 0.3: Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.3: Spot worth: 3.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.9 worth Interpolation 0.2: Spot worth: 2.9 worth Interpolation for 0.2: Spot worth: 2.## Here's the function that maps x to y: The function f(x) is for the given experiment data. The data is given by the table below. Find f(0.25) using Lagrange Inpolation, Newton Interpolation, Stepwise Interpolation, Spline Interpolation, and with the given data. table: x 0.0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.7 1.0 y 0.0 0.0627 0.1254 0.1881 0.2508 0.3135 0.3762 0.4389 0.5038 0.5667 0.6280 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Simultaneous equations: [Compute the answer using given methods] Using Lagrange Inpolation, find f(0.25) using the method of the quadratic formula: Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] ## Simple multiplication: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Inpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] <function "f" is> ## Here is the function that maps x to y: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x 0.0 [Compute the answer using given methods] Using Lagrange Interpolation, find f(0.25) using the method of the quadratic formula: [Compute the answer using given methods] Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] <function "f" is> ## Compute the answer using given methods: [Compute the answer using given methods] <function "f" is> ## Here is the function that maps x to y: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] <function "f" is> ## Compute the answer using given methods: [Compute the answer using given methods] <function "f" is> ## Here is the function that maps x to y: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 Answer: Quadratic formula: f(x) = 0.0627x² + 0.1254x + 0.0 [Compute the answer using given methods] <function "f" is> ## Compute the answer using given methods - Cuplikan Gratis dan Subtitle Bahasa Indonesia srt.
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Aktris: Kana Mito 水戸かな
Studio Produksi: MADONNA
Direktur: Hiroyuki Kimura 木村浩之
Tanggal Rilis: 24 Mei, 2024
Durasi: 121 minit
Harga Subtitle: $163.35 $1.35 per menit
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