popular JLPT N1 noun noun (generic) noun or participle taking the aux. verb ใใ transitive verb noun taking the genitive case particle ใฎ adjective (generic) mathematics
- composition, synthesis, compounding, combining
- composite photo
- (function) composition
popular noun noun (generic) noun taking the genitive case particle ใฎ adjective (generic) mathematics
- single element, unitary
- one era
- one unknown
popular noun noun (generic) mathematics
- main spindle, main shaft
- linchpin, pivot
- principal axis, main axis
popular noun taking the genitive case particle ใฎ adjective (generic) ใช adjective noun noun (generic) mathematics
- unsettled, uncertain, indefinite, unfixed, variable, irregular, changeable
- indeterminate
popular JLPT N5 godan verb godan verb (archaic) verb (generic) transitive verb intransitive verb mahjong mathematics
- to stick, to paste, to affix
- to stretch, to spread, to strain, to tighten, to put up (e.g. a tent)
- to form (e.g. ice on a pond)
- to fill, to swell
- to stick out, to push out
- to post (a link, etc. online)
- to be expensive
- to keep a watch on, to be on the lookout
- to slap
- to become one tile away from completion
- to span, to generate
popular noun noun (generic) mathematics
- tire track
- traces of a person or thing, path one has taken
- locus
ๅใใzoupopular JLPT N1 noun noun (generic) noun (suffix) physics mathematics
- image, figure, statue, picture, portrait
- figure, form, shape, appearance
- image
popular noun noun (generic) noun taking the genitive case particle ใฎ adjective (generic) noun or participle taking the aux. verb ใใ transitive verb logic mathematics
- temporary construction, temporary establishment, provisional construction
- assumption, supposition
popular noun noun (generic) noun or participle taking the aux. verb ใใ intransitive verb mathematics
- return (to), revolution, recurrence
- regression
popular ใช adjective adjective (generic) noun noun (generic) mathematics
- impossible, incapable (of doing), unable (to do)
- incompetence, inability
- impotence
- having no solution (of an equation)