boy1986 发表于 2017-11-13 15:21:55

一个压控晶振VCXO输出功分为两路,下面是他的电路图,我....

就是不明白用两个电感和电容,中间加一个电阻,就能起到等分功率的目的,我用ADS仿真了一下,感觉没有作用。希望大家积极解惑分析哈

boy1986 发表于 2017-11-14 09:44:14

没人吗?问点稍微高深点就没有人回答了,

yangff 发表于 2017-11-22 23:25:02

本帖最后由 yangff 于 2017-11-22 23:43 编辑

wilkinson功分器?这参数不大对劲哇
电阻应该是100Ω
电感大概应该是112nH的样子?

boy1986 发表于 2017-12-28 17:09:42

yangff 发表于 2017-11-22 23:25
wilkinson功分器?这参数不大对劲哇
电阻应该是100Ω
电感大概应该是112nH的样子? ...

确实是,又一叶遮眼了

angler12 发表于 2017-12-28 21:23:43

楼主可以去搜一下射频功率分配器

catvevs 发表于 2017-12-28 22:17:47

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(V爱P国N)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(V爱P国N)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data:image/png;base64,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

catvevs 发表于 2017-12-28 22:25:05

本帖最后由 catvevs 于 2017-12-28 22:27 编辑

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catvevs 发表于 2017-12-28 22:35:32


仿真结果

catvevs 发表于 2017-12-29 09:26:22

楼主的原理是否画错了,如果L5=L6=27NH ,C30=C31=100PF,会更接近 100MHZ 功分器的结果。

boy1986 发表于 2017-12-29 10:47:14

catvevs 发表于 2017-12-29 09:26
楼主的原理是否画错了,如果L5=L6=27NH ,C30=C31=100PF,会更接近 100MHZ 功分器的结果。

...

谢谢,是我弄错了,其实ADI是没有这个功分器的

wiser803 发表于 2017-12-30 18:19:54

c3 c31 为1000皮法,几乎要把100Mhz频率给短路了,还功分个鬼啊。

boy1986 发表于 2017-12-30 19:15:48

wiser803 发表于 2017-12-30 18:19
c3 c31 为1000皮法,几乎要把100Mhz频率给短路了,还功分个鬼啊。

还有电感,它实际是把两个50的阻拦分别变换成25

liwei_jlu 发表于 2018-1-17 12:21:02

catvevs 发表于 2017-12-29 09:26
楼主的原理是否画错了,如果L5=L6=27NH ,C30=C31=100PF,会更接近 100MHZ 功分器的结果。

...

你好。我手里没有ADS,就用EWB仿真了一下。
中心频率是对的,不过增益是10.5db,放大趋势。而不是-3.7db。是ewb仿真软件的问题吗?

页: [1]
查看完整版本: 一个压控晶振VCXO输出功分为两路,下面是他的电路图,我....