Menghitung Nilai Run Kapasitor pada Pompa Air Listrik
Menghitung Nilai Run Kapasitor pada Jet Pump (Single-Phase Induction Motor)
Ketika membeli Jet Pump (Pompa Air Listrik), biasanya sudah disertakan Buku Panduan (User Manual), Kita ambil contoh: Panasonic / GF-255HCX Jet Pump
#Spesifikasi Teknik:
-Motor: Induksi / 1 Fasa
-Sumber Tegangan: 220 V - 50 Hz
-Daya Keluaran: 250 Watt
-Arus Masukan: 3.0 Ampere
-Jumlah kutub: 2
-Wiring Diagram:
![](data:image/png;base64,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)
Bagaimana cara Menghitung besarnya Run Kapasitor-nya (approximately)?
tertulis: Kapasitor (7.0 µF)
•Daya Kapasitor:
![](data:image/png;base64,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)
Qc: Daya Kapasitor (kVAr)
P: Daya Motor (Watt)
•Daya Reaktif Kapasitor:
![](data:image/png;base64,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)
Vc: Tegangan Kapasitor (Volt)
ω: 2πf (2 x 3.14 x 50)
C: Kapasitansi Kapasitor (µF)
•Kapasitansi Kapasitor:
•Tegangan Kapasitor:
Ia: Arus Kumparan Bantu / Auxiliary Winding (Ampere)
NOTE:
Jika Arus tidak diketahui, maka kita bisa menggunakan -Tabel Run Capacitor-
-Contoh: KRK Capacitor (250 - 400V)
Karena sumber tegangan Motor adalah 220V, maka bisa kita tetapkan Vc: 400V
#Kalkulasikan:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAI0AAADICAIAAABaqfUtAAAZdUlEQVR4nO2d328TV9rHnz9gbubSF5EiWZZ8gYSiKBdBUZVcBAUhQQWKolBkhaqrBHVRwqKGbdVApQJS62qp0W69q+1oi0W3hmbkBUMxNAmJ0zdhyRRsBS87NAlrA5PGTuLkHfJOyDgz78UZj2c8Y8cpWceHzucq8dhnPPP1+THnOef7gGyBA7DdX8CiJCyd8MDSCQ8snfDAVKd1gbt/6zLlcf/Be+m78elFcUtOJb1I3P2Opm9FUobyxGRsiKY8n3moQJhdEGVZllc55iatciOSkko8zVqaHb3m87o9FB1m06JUqCiJnx6lKY/beykUTYqllr5dGHVa5QY+biIgB9FwtP+ntVc7jcQ/Cpw6YAcAaHQzvP7gfLivQXO6QxS7IssJ2mXPvWh3MyX9WNaXwx85cx+ravb8uGJalBDzddSob2s6fSdZ2Url6yQ9p4+QAM7f+h484bhn02N/6XAQQB6ln6/JsiyLi9PjtwKBW5usZCJHdxKN7xxrdZrpxLOhwGBsThC5UG8dgN1FJxSd9rpDDMMwDBNN8Ln7uJpiHzDM45QoyRKfiDIMq9ZQaSXy93PUrcg0O3bhLRIAajyRjLEocS7YTYK9jYqtrMSoNjtAK8UKm7975SNPJ5Gjuwggd3kevFReWQj31QPs7A79rPsNEm15F7YeD77f4dLQ42UWswclcf75rLDMuBvNdMq+h3/k79oJ0NAXntfodD/2ZEHQ/dj5h942AhztvkfLD/+yjyDr3fdW8ktbXx583wYAuyl23VjU0viZhuw34Rl3I0Bt72Dql93B8pCnE/rS6BeNWEv4jwDYXfTMXLCbBFvT2dvTz38av9I/ntTVKIkLnS6ok7ZwM52SwU6lpSUcR69xkqxv96oae/pZjVbSwsBJJwHOg64DDnB+OLiQyS9QnPJ3OAFqjwYTkklRcdplBzjiT6yhuq6/5EpkQ50ElmoFsLvoWNHaIMuSkJ7lNMylhXWzws1KEGbCAbrf91lXYxVATYcvJiiNG8OMX3O3OpQKnWPtOX2UBACo3k/F8vtOaekh9RsHVDWdus2JkmxS1F3apbZ16g8RJ50yyeAxAogdZ8aUlkSK00ecAHs9kVnG3QjQcGZ8ybSgTMSj9suovzZceWGdFKTV8bPVANDgjeVqiPpD0ZQmLYyf3Y3qn/PkwIK2VVREIhwdXz3k8+pZ3m8OXQtqA1s8kReF79L2YxhHJG/2OAggmru/8AeDgYtnDjkAyPZLU2uo7yXrei6OjH33ZXfnhbwLE1Mso+UBm1pVSxU55jr9tdu1A2CHy/11IDwjrD/2vVkNjg8GUzH/idNeemB8/BbV/QYA4ewbWV78wXuWCobvjg981dtUBdDiZtTfh7TGUvsJwvneH//U4dQfWucn/tBEABAtvV9eoWmaDgyz8RFDUQsLoRPoWoaHL/bUkbDj3PhKRQ/4jOPyDP/wUledTTswd7Sdo5lnwsupa8ebUT9C1J24Fl81Kc8c1AdocNFcZtLbQAJxLDj35ObxN4jcuc6PcKvy4kCvQ32tocsXzY33pETwaC0Qhyj2xQrzWT0AeYR+rhxdiXn3604ELZ6BgElR4tOBU3uUV+0Hz4VnK1qlQvMRkrD4lI0yTJTlUvHBT/bZCaVlkITU4ygTmUrl9z0bkNd5zaYFSV4X0nNcihfR4adsRDe0k0R+biZ2n2FiTxb1wz1Z5FOzuQ/OcsrfZifiZtOCVKAodC1MLMFvzXP8f5VS5o3WBe7H63+7kjfAsygn1vweHlg64YGlEx5YOuGBpRMeWDrhwWukk8inUjg8Cv0iyqWTScRWElOxIZryuC9Q9CibXpPlDM8OB2gNgWFWO0cncsx19XjgRkQb23sR8bTooi1SMnIjQF9nODVWK3LM9UAgPCPIsnquwBDLV/hUhCzL5dLJLGK7PNLnzIWNif0Uu4YmarXoJ2052qWd6NXFeA2TvNKMv90OsNcTQa9IK+PndqihNeUoANkdnMOgEpZHJ7OIrcCGLg/FUivi/K3eKgDopDlRTD1WZnGHvS4SwPlReFkzQcXRLqja675hEuPV6iSmWIaJJubj/rcJsO2mHq3LsiwvM+5mVTYp7m8niGp7NQH2dv+MJMuynOETk0w0vjgXvXV9bCZ/rn2b2TKdisZzEXkRW4TIT13usuVJgsJLhkBtTifjpF9Wp4n4hHs/ATVH/I9fxv3tBArpyvLLB55dJOy6EHkpyfLLuP9tAvae7/e2E0C0++NStgSyvrGhqmjwZXvYMp02iOeaRGxRrAuBAq9Z1ia9zTYg3vbHX+rOoW33iOae/n9rIv9Ip5rf9HbVQVWz++6ypDZurRQrvIxc2KU2euuPqN022HUhsjrtb7dnT4RKIJxdX94ZGY0aF0VtK1vX7hWP55pEbCVhZjRAf+v7/N1GAsDR6WPRTzizMPihE8DWE1rI6+GVENfE+HfuVhKAPBHKRdw1fVuuaqJ6U7XfF/031ao2eusstRvA1kn9wIzRfc2gNH0bhjG3ky3TqYR4rlwgYosiqmSDdzIjqxFkbfTPAKoQ0Elz6q8e3WXHnr1vEFC9zxtFVU2K+9sJIA6+e6zJlm30UFRXz26KXf916FQsnpthjRHbRfbyiT4vPTg2PvBldx2Z7bQkFPoj9lPsGqpNq9O+wwTU9w5yi6NfnqWuhSfGBi6ebCIA6j9jckHY7F0eGfXuq84uAtSM69RGDzWqVd2+uwzDMMzEP8402QBaKTb169CpCNJTY8RW4m4cz0WNd7a573CilB3BO4/Q8awCKETr7AwmFgc/cKjdU90x38Mlw3ivxRNZXp4430wAecgfX5ezTR+ojV4m5m1AoX3lg+h3YNtN3funUkIlLpQo13OuScRWjRprB2/rQnqO4+Z5URt3Tc8qr4h88kmMYZjYfxbzA8qSyM+jOLEu4Iv+y4aQs//q+06RT3GzKX5NU0LF8RrNG73WWDrhgaUTHlg64YGlEx5YOuGBpRMeWDrhgaUTHlg64YGlEx5YOuGBpRMeWDrhgaUTHlg64YGlEx5YOuGBpRMeWDrhgaUTHlg64YGlEx5YOuHBZnSSVjjm9mXqgoe6cot5VpHrEY17FGVZXk3F7tDUhZxjrLTEDl3V7VvU7SpErlkqZoa2ZadknbTGTQD6PUwVg8kexYzeMbZ6PxVbExm3xjDWsDcxzzWrIlacl6jTGhc87gAg2/44Nv2MSzwK+z6n8rehVQAmexTXBPb7y4OxlLA6H/p9FQC4aE51TmTuDXuPkLrl5nJWpwPuENopMJmogL2FJer0PNjpBKjvCy8UekcJ+wnLhtkeRXFpyv9bW54k5nt4NDqZLGTfHkrTSWkotPuN8inBH7YMmO5RRD8yAABwHA9yqk2ptBb7czOo+z5VdO0e0djbz+LS7ik6IePbAmzsD1sGTPcovpgJX6P7L37e1UQA4ei4pFgCS3ODJ3cB1PSE8kwSpex27rHv3O0kANkdKtiMlIsS272fQ907dZckZcSM7upK209YNvR7FBGr42eqAWC/N7Yiq07tus1u+aAdouCiuXJ852KUqJOyZxYch85c/Jbu/+rTjj1dwee6txTzhy0TGZM9ik9Z/0d93v7B8bEBqqcO1E5riXG3aO2a16d9bxKEo3dgUU6Oej+jgiMT47cv9rYQxm3320HJ43JpKeZ/r1HdFFjX/U0FtNp5mO1RfMnd/H2dOlZ3vOUeeSbK2RG8mudA2WcIRGcwKc8N9tZnP2Cr67pk8G3eBjY1HyGJPMdGTLfzVQoF9ig+y//aBmNZWRLSs7PKCyKfnIkxJqkIto1yzBuBRclsp04Wr46lEx5YOuGBpRMeWDrhAWY6Sal7f/uwvZasa3MPchWfVNDAKjfyp66mnbWtH9GbfPrETKcMG/jE+/dv3S5bZYSFNsdCqJts6PUP0n3Nm50zxEwnWZZlObM0+EEVcdg3Xe55qVeFo12wxx1mGW9byZkxFfDTSVocPdvkVJwQ8SAZdne5XO+8f+1/7pw7aAfSbq+CGk9kM7NR26hTdhlCYHRGCTQsz4wGKM9576VbkaRSV/Ky3Ep8lOqodXRQE/GfS4ubGBZHKOWaJvNVMu1mPZlLvA5DUfkXooSPo4lFnl+VpIXxs7ttvYPLRUvNY/t0UmKpkA0/8qyvM2fb1nR2JCkas9w+vnmCVP7VxyzMWTdZHFE4ma8S6YBNBDLMijK7EEQm4qkhAICoO94/vbkp+O3SCQVKnLW1VUgnaS7YRQLR9hW7ssxSLgJsu6nJWWOW23+lUvlxyGLpdM0WRxRI5ovChjtra0m9Tihew6ZEGRWvjdeYFGV2IY+yFX9dWPxP7BfNYm+TTis/epqrHUcv9n/SiHRCfqSoc0XRY1vvlRslZbktIZ2ubnGEaTJfaSVyoZmoPUr7P7HrdRKi3n3VQB7xTc099LYR+kyJhqIkswvZXBNnyrboJMT9nSRxiGLnGDfSSeDoToDqNv8TSc76Krs+/rS0LLdF0+kWWhyhd4MVp/wdTmI/xa5MuPN0Uqo+4Xzr8AHSkF40vyjR7EK2IBy8HTotj/Q5SWfvtSluKtS3C+AwFZ2d6e+EbBMhJfxtOZ1KyXJbJJ1ugcURupuLurFdvcFH3NNQXzVAKxXV+lqqXalqO6vDqFPeheCpk2ElBQB0+ukzdoDqM+OrStNB1HhG7paY5bZIOl0V/eII/c19EfG05H8jzc2VlsfO1qMBxq6Tg3OG4nVVE7V1+gvZ1AjcnO2oT7l0Jiij7u7eS/e4uZvdJEDd73zD3/t63gBoPDM+X1qW2yLpdAWzxREZQzLf6f9VFyp/63bZABpPXmLUJXArLHWIgF3v/fUPHfnrXszyAi+EDBeSfvV7tr3PuXy2fxJleZUb+LhJWcjg3HduOFliltti6XTXzBZHmCXzVUtD1UFbmbhrRx0EsZ9i19DSF60XtGlRZhfyymyvTpLe4nhdSE1FmPuxxLJ22cJGWW6LpdM1XRxhlsxXV5ruFcWNWS1+Nn9RhUlRZhfyauA3b/TrxNIJDyyd8MDSCQ8snfDA0gkPLJ3wwNIJDyyd8MDSCQ8snfDA0gkPLJ3wwNIJDyyd8MDSCQ8snfDA0gkPLJ3wwNIJDyyd8MDSCQ8snfDA0gkPKkenkqySJZ4dCmidkq8OsUuStpDKs0reEipGp9Kskv+vuFNyRVolbwkVo1OJVsk5N8bvvS6nwZ67Eq2St4Qt02mL/JZLtUou4BpaiVbJW8KW6fTKfsubskp+EfMeALC3+2f0myEq0Sp5S9i6du9V/ZY3YZWsbPS0vRdayGvWKtEqeUvYMp22zm95Q6tktMtzA3vdyrFK3hK2rj69mt/yJqySV+6560ntVtkKt0reEiplvFeyVbJi3aHZNFjpVslbQqXoJJdslWzc1FfhVslbQgXpZFGEX7UvdhmufavA6bv+mrF0wgNLJzywdMIDSyc8sHTCg23QKc/ydaOjBUK0RjNZcYENX/N5z3uoQJhd0DwG/yLX1wqj7DoZLF91Nk0mR01DtEYP1tlwX0PuXcSbnogSq/oFrq8VSJl1EueMlq+sUPQobwzRmnmwjt/3fU7dejA9NXKhzQGq610h11fcKLNOKGZRyPLV9OisIURb3IM1Ndhbm3WULOz6ihtl1ilBF7N8NT06YwjRpgt7sEpi/HIHmQ3+FnN9xYxt0amQ5avp0bghRBucLODBKvFRqqMGiD2nBp6KG7q+YkWZdUKtWSHL1+JHcyHahJkHq4hEgpoOKspL8oaur3hRZp0yZpavwrTvMAH1vYOc2dE5kxCtiQfr9IR7HwFANPV+2U/TNB0YYheLub5iRtnH5SaWrysx734AZ2fwudlR0xCtwYNVnPQ2kLqqo7U5Nri+Ysd2zEcYLF8lIT3LzfPomddoCGseos3zYF0X0nNc6a6vuGHNG+GBpRMeWDrhgaUTHlg64YGlEx5YOuGBpRMeWDrhgaUTHlg64YGlEx5YOuGBpRMeWDrhgaUTHlg64YGlEx5YOuGBpRMeWDrhgaUTHlg64YGlEx6UUScxGRuiKc95r+8Gw2ksqqQlduiq1vM1MMTyypLL+N3rAfpGJCXJspzh2WGdN2xgmN3QvkjkmOvqhwI3IklMl1qWSyfdRkFlq4WCaOr5muHZwKl9zuy/cnaXgJaN7V/zytabyeJEeXRCjnlOFxVJi5LIz3Hpl5qjqyn2AcMwDHNv2HuEVPxFE7RrZ+O7R1tt6t1VPRAZZtjrIvXepHKGT0wyzOOUKCkFRhO8lNWplYpwHJfnXoUV5fGHfR7sdIKtx38/wjAME+PMF3pLcfqIE6DFzSzJ8ur80zkB3eb8WmDqk4hqG6phaB9VJ82Jik447wBAlMUfNhPx1BCa5qemwxczbD2X1mJ/bgYg2v1xVUVTndYmvc02IN72x7WVsqhO9sZWl8vl6nKHk1t1vWWmLP6wyh7at70/PJqZvNRpA6g+O76qr1NowzPU9IRmcwdMdMosDH7oBLD1hBZ0BVg6lUYxf1jpib+tGsgToYWM7m8N5j7XRp10baMWq90rkWL+sHzEsxegrosauPe9p40Eot0fzzz2vVkNjg8GFzOyvMS4W5Djf9b6epVjbir7AG0u97fXwjMvZFlaYT6rV7IF5HVxSCdH65mL/i96GgkAOPDp9cmnY59aOm0CKXnndFOVsme96eMBblXOTHobSCCOBZMZJWkDeZR+rjqUozqRVzvnw30NAM4jdNwwENGM2u1vvtd7yAEAxLHATXeNYh2LN+V7zpWEhSex+xqn13UhPcehkTLq23Sj5rz9gai3Qy9mdx7qQDq1fRGO/ZQSJElIPY5GZhZFrXUszrw280ba/uk15LXRKcOzw4FSZpLw5LXR6TXH0gkPLJ3wwNIJDyyd8OD11EniE1ElxqFBfJHOf5AS+ZTp05hJkSI/X/JzWOnFGk5j+s3LpFPhiG2WDD/zA01dcHu/DkXmSrgZxfN6LjHuFv3shqzEVhwfDC6KAnvlZMc77wefvIx4aqCqhXq08Vg+E/HUEEQLxZYw7M+UXmw+yItOPxkty3KZdDKP2KqHJYG91OHIBj6IPadH8r+lgbzYrv7xdnmw1wZkV3BOV4o6OftyOfyRE6paqEerpuGtIpdQ8K0C6z/p6jgfXsxs/N7irIyd2UHogjuyLJer3TON2GaRngW7dgDhotjlFfarNgJgN8WqcVqJT0QZhk2JsjLVG03wkqJTdSvFcBynn0laXx5836a6XcoZPn4vFLg+FJv4JjuJLvHTo9cHIslV5YZ+OjB991YgOBxDE8emZ9Tee2mFi/0QCtCB0A8xbkWSM3zinq+7FuCAO/TPaILXvDcXWZYELjYaCtD/CI3GOGFdCUBH4+nFqfHQ1eBQLNvWpQZ7a4HoovUOdOXN92kalUA57XRur+8PLutjV+hozmIU6WSaWg/ZI6IaluEjf9qnjVBqgh12NyPo6znRdHYkKepM4NQz5r6GwFJtuSIdx4PcorZyq8Xa3XcXJs43E4TjiH9a+BfVUqWex3H0GifxjLsRyPrGBvR6VdPZ0UVJluXVGd9bAPV9YV1ixXLm+zSL2Kr3os2fkGRt6KgEnQh740GXy6U2OLIsy/LPoe6disksqqnQfCo0+e8Rb4eDMNWJaDp9bfLhiPsggRbYbKDTamLocmBiKpmen/K/SyrOqNFLSn1i2JRSTat+c+J4HUk0n59Yzsjr8aGLVyem59LpR/7OHQCdNJdm3I0AVU19V8bu9ffVk9lfp9E2d0t12jjfp2nEVr0XqK1DUcRX0kmjtK6jyA8ean74uZpsdzPiBjpJYvJBwPtRd4fr8N5aQrmh6PsoX1vTHatpmFeTkaveU90drkN7a20anfIDm7IsvQifrvrv6bRhvs8CmYmzl4Ui8agNNFpRbqLdQyl3NTopMf5N6oTqt1Gnl9P+Qw4g9/X+9Ztv3S5bYZ1se/buJoDY95eHgrQe9x8igdx78q/+r92uHUV1+m/Xpw3yfRoitutqPPd5qHsnwBs9vu+Hfb+rA2LHmbHcQiJ00WTbmb9//UV3MwEAez+5HvtprKT+6edsyTdvfnm8kSjQPzmOeL676et5A2BHV/CZhFbdaM+o1Ql9pskdjj8eu/AWqdOpsfebW3eiyTXlvQMRbxuRS0tva3LfiU8jG/wiOqH+SWvrvrU6FccYsc3Fc0WRu31KifYS9n3ucFIz1Mk1IoR9X3fv4RoAIDq/vulpUSxl80FWwWi8pxnxO/a7Du5E4WORcduBqPFEVhm3HZwHXQccqHtX8iivTPuPKq+89c5hJ0F0BpPoa9R4Ihk1ZQRhr62xKzplFsc+bSIAcsUSNZ6IuHzX3VwF5Dv+R/ezy0zttbV2jU7IUDpBu+xKaFvxyX/LN6PLalsunQpFbLOvSELycYRhYk/zH+PRDdr3xzA7kxLWJSH5ODI5k17TWcrmnWou2EWqmaglkX8aY6LKR9DpRD6Fuk+RT3HzvPgyPRPVn1rkE7EfY095MSOk51K8qHeYXUvPRJnIVEpYSc+q3bDIc48jkamUUix6XRL5eeWxQVycifwYeZwUhPTsbFqQJJGfz7rYam4Fen560zet79wrft7olzw0zof7GoDsDpYys1FZSCvj53aYLQCpeJ2kJXboqmGeaYPPiKnYUGhsBr/YriQmo7dvm6RbqnidLGRZtnTCBUsnPLB0wgNLJzywdMIDSyc8+H+hin9wwYr74AAAAABJRU5ErkJggg==)
Jadi Kapasitor yang digunakan adalah 7.0 µF - 400V
Baca juga:
Name Plate pada Generator Set (Genset)
Blog.Teknisi
Ketika membeli Jet Pump (Pompa Air Listrik), biasanya sudah disertakan Buku Panduan (User Manual), Kita ambil contoh: Panasonic / GF-255HCX Jet Pump
#Spesifikasi Teknik:
-Motor: Induksi / 1 Fasa
-Sumber Tegangan: 220 V - 50 Hz
-Daya Keluaran: 250 Watt
-Arus Masukan: 3.0 Ampere
-Jumlah kutub: 2
-Wiring Diagram:
Bagaimana cara Menghitung besarnya Run Kapasitor-nya (approximately)?
tertulis: Kapasitor (7.0 µF)
•Daya Kapasitor:
Qc: Daya Kapasitor (kVAr)
P: Daya Motor (Watt)
•Daya Reaktif Kapasitor:
Vc: Tegangan Kapasitor (Volt)
ω: 2πf (2 x 3.14 x 50)
C: Kapasitansi Kapasitor (µF)
•Kapasitansi Kapasitor:
•Tegangan Kapasitor:
Ia: Arus Kumparan Bantu / Auxiliary Winding (Ampere)
NOTE:
Jika Arus tidak diketahui, maka kita bisa menggunakan -Tabel Run Capacitor-
-Contoh: KRK Capacitor (250 - 400V)
Karena sumber tegangan Motor adalah 220V, maka bisa kita tetapkan Vc: 400V
#Kalkulasikan:
Jadi Kapasitor yang digunakan adalah 7.0 µF - 400V
Baca juga:
Name Plate pada Generator Set (Genset)
Blog.Teknisi
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