Android动画之小球拟合动画的示例分析
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Android动画之小球拟合动画实例
实现效果:
动画组成:
1.通过三阶贝塞尔曲线来拟合圆,拟合系数的由来,以及怎么选控制点.
2.利用画布canvas.translate,以及scale,rotate的方法,来渐变绘制的过程.
3.熟悉拟合过程.
4.不熟悉的话,先绘制辅助点的移动路线,对理解两个圆的分裂的拟合过程有好处.
package com.example.administrator.animationworkdemo.views; import android.animation.ValueAnimator; import android.content.Context; import android.graphics.Canvas; import android.graphics.Paint; import android.graphics.Path; import android.graphics.PathMeasure; import android.util.AttributeSet; import android.view.View; import java.util.concurrent.CyclicBarrier; /** * 这个例子中,大家可以发现作者的拟合做的并不是很好,连接的地方比较生硬,大家可以思考下如何改善 * 贝塞尔曲线绘制比较复杂,大家在学习过程中,可以仿照示例中的,将辅助点和线绘制出来,这样会看的更清楚一点 */ public class BallShapeChangeView extends View { // 使用贝塞尔曲线来拟合圆的magic number //C 是三阶贝塞尔曲线拟合 圆的 误差最小 获得控制点的参数. private static final float C = 0.551915024494f; private Paint mPaint; private int mRadiusBig = 120, mRadiusSmall = (int) (mRadiusBig / 2f), mWidth, mHeight, mMimWidth = (int) (mRadiusSmall * 2 * 3)/*fill view mim width*/; private float mFraction = 0, mFractionDegree = 0, /*degree*/ mLength, mDistanceBezier; private Path mPathCircle, mPathBezier; private ValueAnimator mValueAnimator; private float[] mPointData = new float[8];// 4个数据点 顺时针排序,从左边开始 private float[] mPointCtrl = new float[16];// 8个控制点 private float[] mPos = new float[2]; private PathMeasure mPathMeasure; private Path mPathBezier2; public BallShapeChangeView(Context context, AttributeSet attrs) { super(context, attrs); mPaint = new Paint(); mPaint.setStyle(Paint.Style.FILL); mPaint.setColor(0xFF7C191E); mPaint.setAntiAlias(true); mPathCircle = new Path(); mPathBezier = new Path(); mPathBezier2 = new Path(); mPathMeasure = new PathMeasure(); mValueAnimator = ValueAnimator.ofFloat(0, 1, 0); mValueAnimator.setDuration(3000); mValueAnimator.setRepeatCount(Integer.MAX_VALUE); mValueAnimator.addUpdateListener(new ValueAnimator.AnimatorUpdateListener() { @Override public void onAnimationUpdate(ValueAnimator animation) { mFraction = (float) animation.getAnimatedValue(); mFractionDegree = animation.getAnimatedFraction(); invalidate(); } }); } @Override protected void onMeasure(int widthMeasureSpec, int heightMeasureSpec) { // 为了能够更好的控制绘制的大小和位置,当然,初学者写死也是可以的 super.onMeasure(widthMeasureSpec, heightMeasureSpec); mWidth = MeasureSpec.getSize(widthMeasureSpec); mHeight = MeasureSpec.getSize(heightMeasureSpec); int widthMode = MeasureSpec.getMode(widthMeasureSpec); int heightMode = MeasureSpec.getMode(heightMeasureSpec); if (widthMode != MeasureSpec.AT_MOST && heightMode != MeasureSpec.AT_MOST) { if (mWidth < mMimWidth) mWidth = mMimWidth; if (mHeight < mMimWidth) mHeight = mMimWidth; } else if (widthMeasureSpec != MeasureSpec.AT_MOST) { if (mWidth < mMimWidth) mWidth = mMimWidth; } else if (heightMeasureSpec != MeasureSpec.AT_MOST) { if (mHeight < mMimWidth) mHeight = mMimWidth; } setMeasuredDimension(mWidth, mHeight); } @Override protected void onDraw(Canvas canvas) { super.onDraw(canvas); // 通过mFraction来控制绘图的过程,这是常用的一种方式 canvas.translate(mWidth / 2, mHeight / 2); canvas.scale(1, -1); canvas.rotate(-360 * mFractionDegree); setDoubleCirClePath(); canvas.drawPath(mPathCircle, mPaint); if (mFraction < (1 / 3f)) {// 缩小大圆 setCirclePath(); canvas.drawPath(mPathCircle, mPaint); } else if (mFraction < 3 / 4f) {// 画贝塞尔曲线 setBezierPath3(); canvas.drawPath(mPathBezier, mPaint); canvas.drawPath(mPathBezier2, mPaint); } else {// 画分离 //setLastBezierPath(); //canvas.drawPath(mPathBezier, mPaint); } } private void setDoubleCirClePath() { mPathCircle.reset(); if (mFraction < (1 / 3f)) { mPathCircle.addCircle(-mRadiusSmall / 2f * mFraction * 3, 0, mRadiusSmall, Path.Direction.CW); mPathCircle.addCircle(mRadiusSmall / 2f * mFraction * 3, 0, mRadiusSmall, Path.Direction.CW); } else { float distance = (mFraction - 1 / 3f) / (2 / 3f) * (mRadiusSmall * 2 + mRadiusSmall / 2f); mPathCircle.addCircle(-mRadiusSmall / 2f - distance, 0, mRadiusSmall, Path.Direction.CW); mPathCircle.addCircle(mRadiusSmall / 2f + distance, 0, mRadiusSmall, Path.Direction.CW); } } // mFraction 0 ~ 1/3 private void setCirclePath() { mPointData[0] = -mRadiusBig + mRadiusSmall / 2f * mFraction * 3f; mPointData[1] = 0; mPointData[2] = 0; mPointData[3] = mRadiusBig - mRadiusBig / 2f * mFraction * 3f;//0到1 的三分之一 用来给大圆做效果; mPointData[4] = mRadiusBig - mRadiusSmall / 2f * mFraction * 3f; mPointData[5] = 0; mPointData[6] = mPointData[2]; mPointData[7] = -mPointData[3]; mPointCtrl[0] = mPointData[0];// x轴一样 mPointCtrl[1] = mRadiusBig * C;// y轴向下的 mPointCtrl[2] = mPointData[2] - mRadiusBig * C; mPointCtrl[3] = mPointData[3];// y轴一样 mPointCtrl[4] = mPointData[2] + mRadiusBig * C; mPointCtrl[5] = mPointData[3]; mPointCtrl[6] = mPointData[4]; mPointCtrl[7] = mPointCtrl[1]; mPointCtrl[8] = mPointData[4]; mPointCtrl[9] = -mPointCtrl[1]; mPointCtrl[10] = mPointCtrl[4]; mPointCtrl[11] = mPointData[7]; mPointCtrl[12] = mPointCtrl[2]; mPointCtrl[13] = mPointData[7]; mPointCtrl[14] = mPointData[0]; mPointCtrl[15] = -mPointCtrl[1]; mPathCircle.reset(); mPathCircle.moveTo(mPointData[0], mPointData[1]); mPathCircle.cubicTo(mPointCtrl[0], mPointCtrl[1], mPointCtrl[2], mPointCtrl[3], mPointData[2], mPointData[3]); mPathCircle.cubicTo(mPointCtrl[4], mPointCtrl[5], mPointCtrl[6], mPointCtrl[7], mPointData[4], mPointData[5]); mPathCircle.cubicTo(mPointCtrl[8], mPointCtrl[9], mPointCtrl[10], mPointCtrl[11], mPointData[6], mPointData[7]); mPathCircle.cubicTo(mPointCtrl[12], mPointCtrl[13], mPointCtrl[14], mPointCtrl[15], mPointData[0], mPointData[1]); } // mFraction 1/3 ~ 3/4 private void setBezierPath3() { mPointData[0] = -mRadiusSmall / 2 - (mFraction - 1 / 3f) * mRadiusBig * 2f; if (mFraction < 2 / 3f) { mPointData[1] = -mRadiusSmall; } else { mPointData[1] = -mRadiusSmall + (mFraction - 2 / 3f) * 3 * mRadiusSmall; } if (mFraction < 3 / 4f) { mPointData[2] = 0; } else { //当分裂超过一定程度让结束点的位置变远 mPointData[2] = (mFraction - 3 / 4f) * 16 * mPointData[0]; } //当动画执行进度大于2/3时,此时该点接近于0 mPointData[3] = -mRadiusBig + mFraction * mRadiusBig * 1.5f < -0.01f * mRadiusBig ? -mRadiusBig + mFraction * mRadiusBig * 1.5f : 0.01f * -mRadiusBig; mPointData[4] = mPointData[2]; mPointData[5] = -mPointData[3]; mPointData[6] = mPointData[0]; mPointData[7] = -mPointData[1]; mPointCtrl[0] = mPointData[0] + mRadiusSmall; mPointCtrl[1] = mPointData[3]; mPointCtrl[2] = mPointData[0] + mRadiusSmall; mPointCtrl[3] = -mPointData[3]; mPathBezier.reset(); mPathBezier.moveTo(mPointData[0], mPointData[1]); mPathBezier.quadTo(mPointCtrl[0], mPointCtrl[1], mPointData[2], mPointData[3]); mPathBezier.lineTo(mPointData[4], mPointData[5]); mPathBezier.quadTo(mPointCtrl[2], mPointCtrl[3], mPointData[6], mPointData[7]); mPathBezier2.reset(); mPathBezier2.moveTo(-mPointData[0], mPointData[1]); mPathBezier2.quadTo(-mPointCtrl[0], mPointCtrl[1], -mPointData[2], mPointData[3]); mPathBezier2.lineTo(-mPointData[4], mPointData[5]); mPathBezier2.quadTo(-mPointCtrl[2], mPointCtrl[3], -mPointData[6], mPointData[7]); } // mFraction 1/3 ~ 3/4 private void setBezierPath() { mPathBezier.reset(); float distance = (2 * mRadiusSmall + mRadiusSmall / 2f) * mFraction; //float topY = mRadiusSmall * (1 - 0.6f * mFraction); float topY = mRadiusSmall - mRadiusSmall * (mFraction - 1 / 3f); float distanceBezier = topY - distance * C * (0.5f + 0.5f * mFraction); if (mDistanceBezier != 0 && distanceBezier < (mDistanceBezier)) { distanceBezier = mDistanceBezier; } mPathBezier.moveTo(-distance, topY); mPathBezier.cubicTo(-distance, distanceBezier, distance, distanceBezier, distance, topY); if (mDistanceBezier == 0) { mPathMeasure.setPath(mPathBezier, false); mLength = mPathMeasure.getLength(); mPathMeasure.getPosTan(mLength / 2, mPos, null); if (mPos[1] <= 8) { mDistanceBezier = distanceBezier; mPathBezier.reset(); mPathBezier.moveTo(-distance, topY); mPathBezier.cubicTo(-distance, mDistanceBezier, distance, mDistanceBezier, distance, topY); mPathBezier.lineTo(distance, -topY); mPathBezier.cubicTo(distance, -mDistanceBezier, -distance, -mDistanceBezier, -distance, -topY); mPathBezier.close(); return; } } mPathBezier.lineTo(distance, -topY); mPathBezier.cubicTo(distance, -distanceBezier, -distance, -distanceBezier, -distance, -topY); mPathBezier.close(); } // mFraction 3/4 ~ 1 private void setLastBezierPath() { float x = -mRadiusSmall / 2f - (mFraction - 1 / 3f) / (2 / 3f) * (mRadiusSmall * 2 + mRadiusSmall / 2f); mPathBezier.reset(); mPathBezier.moveTo(x, mRadiusSmall); mPathBezier.quadTo(x, 0, x + mRadiusSmall + mRadiusSmall * (4 - mFraction * 4), 0); mPathBezier.quadTo(x, 0, x, -mRadiusSmall); mPathBezier.lineTo(x, mRadiusSmall); mPathBezier.moveTo(-x, mRadiusSmall); mPathBezier.quadTo(-x, 0, -x - mRadiusSmall - mRadiusSmall * (4 - mFraction * 4), 0); mPathBezier.quadTo(-x, 0, -x, -mRadiusSmall); mPathBezier.lineTo(-x, mRadiusSmall); mPathBezier.close(); } @Override protected void onAttachedToWindow() { super.onAttachedToWindow(); if (!mValueAnimator.isRunning()) mValueAnimator.start(); } @Override protected void onDetachedFromWindow() { super.onDetachedFromWindow(); if (mValueAnimator.isRunning()) mValueAnimator.cancel(); } }
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