1) approach to saturation
趋近饱和
2) the law of approach to saturation
趋近饱和律
3) Approach saturation temperature △T
趋近饱和温度△T
4) LATS method
趋近饱和定律
1.
In this paper,the applicability and arithmetic of LATS method to the Nano- composite permanent material have been analysed.
分析了传统的趋近饱和定律对蚋米复合材料的适用性及具体方法,为利用趋近饱和定律(LATS)计算复合磁性材料的有效各向异性常数,进而为研究材料的矫顽力机理提供了理论基础。
2.
The calculation result shows that the LATS method is suitable for the calculation of the effective anisotropy constant and the saturation magnetization in nanocomposite permanent magnetic materials.
利用趋近饱和定律(LATS)计算了Nd2Fe14B/-αFe纳米复合永磁材料的有效各向异性常数和饱和磁化强度,并对计算结果的正确性和适用性进行了分析。
5) approach adiabatic saturation temperature
趋近绝热饱和温度
1.
3,coarse particle mass fraction ρ_s=10 kg/m~3 and approach adiabatic saturation temperature Δt=8-10 ℃,the system can continually and stably opera.
3,粗颗粒质量浓度ρs=10 kg/m3,趋近绝热饱和温度Δt=8—10℃的条件下,脱硫效率达90%。
6) approximation and saturation
逼近和饱和
1.
The approximation and saturation problem by S U σ in Holder metric is studied and the saturation class and the saturation order are determined.
本文研究此指数型整插值算子在 H lder度量下的逼近和饱和问题 ,确定了饱和类和饱和
2.
Let k∈Z, σ>0, xk=2kπ/σ, , The approximation and saturation problem by S in the Holder metric is studied, and the saturation class and the saturation order are determined.
研究了指数型整函数插值算子,,在Holder度量下的逼近和饱和问题,确定了饱和类和饱和阶。
3.
The approximation and saturation problem by a kind of tri- gonometric interpolation polynomials in the H(?)lder metric is studied, and the saturation class and the saturation order are determined.
研究了在Hlder度量下,一类三角插值多项式的逼近和饱和问题,确定了饱和类和饱和阶。
补充资料:趋趋
1.即促织。今谓蛐蛐。
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