抛物线倾斜角
这几天还真实的感受到了寒意
周末能悠闲的泡个温泉就最爽啦~
童话民宿、悬崖温泉、日式私汤、古风小墅
......
这份泡汤指南送!给!你!
01
美到窒息的森林童话民宿
住进一间房,独享一座山
— 千岛湖茂山·青田野 —
山里的最后一户人家,很避世。
茂山的房子,遵从“古法”的新民居——麻刀泥墙立起的LOFT,木顶黛瓦盖的Villa。大方的轩敞通透,现代的明快实用。
这里一共有14间房,5个独栋独庭院,一栋一间,其余9间房散布在2栋别墅里。
这里有2个温泉汤池,都是山泉水温泉,一个可以容纳10个人左右大的,另一个是需要提前预定的私汤。
02
世外桃源般的后现代风温泉
南方有隅,其名沐野
— 无锡·小筑沐野 —
「小筑沐野」坐落于无锡阳山桃花源AAAA级景区,位于阳腰山的半山腰中。这里有亿年火山,千年古刹,百年书院,人文底蕴丰厚。
小筑沐野是一个致力于打造舒适惬意,多边立体旅居环境的轻奢温泉名宿名牌。以一户一庭院,一院一汤池为设计理念,有三栋独立建筑,共十六间风格迥异的房间。
每个房间都设有私享庭院和温泉,并共享三十多亩的果园与山林。
03
古朴的古镇小宅
江南水墨画中走出来的温泉酒店
— 新西塘·悦木堂温泉度假酒店 —
古朴的古镇小宅,仿佛从江南水墨画中走出来。坐落在美丽的嘉善县新西塘北区,距市中心1公里,高铁站2公里。沪杭高速3公里。是目前新西塘景区内高档、个性化民宿。
这里安静、质朴,真正还原枕水江南的韵味。十二间房中有四间私汤房,以及一个公共汤池。
温泉都是24小时循环替换的,所以随时随地都可以泡一个舒舒服服的温泉。再撒上玫瑰花瓣,也太浪漫了吧!
04
莫干山唯一的日式温泉
打卡圣托里尼风星空屋
— 圣岛·莫干温泉美墅 —
浪漫土耳其角、巴厘岛同款漂浮下午茶最流行、最ins的当下网红元素,全都有!
一栋栋坐落在竹海里的蓝白色童话小屋有序地衔接着,抛物线倾斜角、几何形等组合构成,给人带来视觉上的洗礼,又呈现出说不出来的美感。
下沉式的一榻一案与一花一草之中流露出清欢之味。充满岁月感的旧木家具,复古的抱枕坐垫,每个小细节中都体现着Lisa对舒适和浪漫的追求。
在莫干山脚下也能体验日式温泉,美墅的主人将日本京都最传统的温泉汤池馆带入莫干山的翠竹林间。
05
莫干山常年一房难求
独有泡汤+汗蒸
— 西竹云见温泉美墅 —
见竹海、见山、见云,都在西竹云见。
西竹云见共有客房16间、其中10间阳台山景房,5间庭院山景房,1间日式套房,常常一房难求。
莫干山有户外浴缸的不少,有泡汤的也不稀有,但是有地下深井温泉水+独立汗蒸房的目前则只此一家西竹云见了。
西竹云见独立的汗蒸房,底下铺满水循环地暖,通过黄泥与各种石头的加热,或坐或躺,有益于驱寒活血。
06
设计师老板
可以阅读的温泉民宿
— 南京子曰温泉民宿 —
【子曰】温泉阅读民宿,这家民宿其实已经很有名气了,因为它的设计和私汤,民宿老板毕业于英国伦敦艺术大学(UAL)空间设计专业。
如果不提前说明的话,可能不会想到这里会是一家民宿,因为它更像是一个建筑美学空间,大到整体构型,小到门牌,每一处都充满设计之美和惊喜。
子曰共有五间客房,都以《诗经》里诗的名字来命名,分别为“蒹葭、蔓草、鹿鸣、关雎、子衿”。
温泉水由汤山统一提供,温度大约45°,这里的温泉水没有硫磺味,老板还贴心的准备了薰衣草泡汤用,温泉洗去疲惫,有益身心,薰衣草帮助睡眠。
07
被承包成“私人花园”
在博物馆中泡星空私汤
— 武义璟园蝶来望境温泉酒店 —
要说江浙沪周边景致别致又能泡到高品质温泉的地方,第一个想到的就是武义。
20万平方米的4A级景区被承包成“私人花园”,住进货真价实的“博物馆”里,更能在别墅的私汤池中来一个私密的温泉浴助眠!这里有足够的美好,令你沉醉其中。
幽静的小路和古雅的围墙将每一个居住的空间分开,26间独立温泉度假美墅,分别散落在璟园23幢精巧复工的明清老宅中。
推荐了这么多超美得温泉民宿
赶紧约上小伙伴
一起去泡温泉吧~
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魏饺牧923在抛物线y=x^2上的点哪处的切线倾斜角为(π/4)急用, -
冉晨钟18189782820 ______[答案] 设在点(a,b)处的切线倾斜角为(π/4)则这条切线的方程为:y=x-(a-b)将这条切线方程代入抛物线y=x^2方程中得:x^2-x+(a-b)=0由△=1-4(a-b)=0得:1-4a+4b=0 ⑴又因为点(a,b)在抛物线y=x^2上,所以代入得:b=a^2 再将...
魏饺牧923在抛物线y=x^2上的点哪处的切线倾斜角为(π/4) -
冉晨钟18189782820 ______ 解:设在点(a,b)处的切线倾斜角为(π/4) 则这条切线的方程为:y=x-(a-b) 将这条切线方程代入抛物线y=x^2方程中得: x^2-x+(a-b)=0 由△=1-4(a-b)=0得: 1-4a+4b=0 ⑴ 又因为点(a,b)在抛物线y=x^2上,所以代入 得:b=a^2 再将此代入⑴式得: 1-4a+4a^2=0 解得:a=1/2 b=1/4 所以在(1/2,1/4)处切线倾斜角为(π/4)
魏饺牧923过抛物线y2=4x焦点的弦长为16/3,则此弦所在直线的倾斜角为? -
冉晨钟18189782820 ______[答案] 设斜率为K ,因为过焦点(1,0),所以方程可以写成Y=K(X-1),与抛物线联立 去掉Y 整理成关于X的方程,所以16/3=(1+K^2)^1/2*((X1-X2)^2)^1/2 根据根与系数的关系 可求得K 即!
魏饺牧923抛物线中x1+x2=p2/sinA对吗(A为直线l与抛物线的倾斜角) -
冉晨钟18189782820 ______[答案] x1+x2=2P/(sinA)^2-P,这里的抛物线必须在x轴的正半轴侧
魏饺牧923高二数学题 关于抛物线已知抛物线y^2=2px(p>0),过焦点F的直线L交抛物线于A、B两点,直线L的倾斜角为α,求证:|AB|=2P/sin²α. -
冉晨钟18189782820 ______[答案] 抛物线y^2=2px焦点F坐标(p/2,0)焦点F的直线L倾斜角为αAB方程为y=(x-p/2)tanα联立y=(x-p/2)tanαy^2=2px[(x-p/2)tanα]^2=2px(tanα)^2x-[p(tanα)^2+2p]x+(ptanα)^2/4=0|x1-x2|^2=|x1+x2|^2-4x1x2=[p+2p/(tanα...
魏饺牧923已知抛物线x^2=4y,过焦点F,倾斜角为45度的直线交抛物线于A,B两点,则线段AB的长为 -
冉晨钟18189782820 ______[答案] ∵抛物线为x²=4y,∴焦点在y轴上,p/2=1.即焦点坐标为F(0,1). 又∵倾斜角为45度的直线方程为y=x+b,现直线经过F点.∴直线方程为y=x+1. 设A(x1,y1),B(x2,y2),将y=x+1代人x²=4y整理可得x²-4x-4=0.由韦达定理得x1+x2=4;x1•x2=-4 ∴(x1-x2)²=(x...
魏饺牧923抛物线一些公式的证明,希望有人能替我解答一下,如下过抛物线y^2=2px(p>0)焦点F作倾斜角为θ的直线L,L与抛物线相交于A(x1,y1),B(x2,y2),有 ① x1*x2 ... -
冉晨钟18189782820 ______[答案] 设直线为y=k(x-p/2) ①抛物线为y^2=2px ②由上两式可得k^2y^2/2p-y-pk/2=0 .③由③可知y1y2=-p^2由①③可知y1y2=k^2[x1x2-p/2*(x1+x2)+p^2/4]又x1+x2=(y1+y2)/k-p由上带入可得x1x2= p^2/4弦长:|AB| = x1+x2+p不用说...
魏饺牧923直线L过抛物线y平方=负8x焦点,且与抛物线交于A,B两点,求线段AB的长度倾斜角为135度 -
冉晨钟18189782820 ______[答案] 线段AB的长度与斜率有关,长度不定
魏饺牧923有关抛物线的问题已知抛物线y^2=2px(p>0),过焦点F的弦的倾斜角为θ(θ≠0),且与抛物线交于A、B.1,求证|AB|=2p/(sinθ)^22,求|AB|的最小值 -
冉晨钟18189782820 ______[答案] 1,设焦点弦得方程为y=k(x-p/2) k=tanθ 那么设A(x1,y1) B(x2,y2) 则|AB|=x1+x2+p 联立方程有:2px=k^2(x-p/2)^2 展开由韦达定理有:|AB|=2p(k^2+1)/k^2 注意到(k^2+1)/k^2=1/sin^2 于是|AB|=2p/(sinθ)^2 当k不存在,即sinθ=1 有|AB|=2p 验证知其成...
魏饺牧923 过抛物线 的焦点 作倾斜角为 的直线与抛物线分别交于 , 两点( 在 轴左侧),则 . -
冉晨钟18189782820 ______[答案] 过抛物线的焦点作倾斜角为的直线与抛物线分别交于,两点(在轴左侧),则.