Intake
(In"take`) n.
1. The place where water or air is taken into a pipe or conduit; — opposed to outlet.
2. the beginning of a contraction or narrowing in a tube or cylinder.
3. The quantity taken in; as, the intake of air.
Intaminated
(In*tam"i*na`ted) a. [L. intaminatus. See Contaminate.] Uncontaminated. [Obs.] Wood.
Intangibility
(In*tan`gi*bil"i*ty) n.; pl. Intangibilities [Cf. F. intangibilité.] The quality or state of being
intangible; intangibleness.
Intangible
(In*tan"gi*ble) a. [Pref. in- not + tangible: cf. F. intangible.] Not tangible; incapable of being
touched; not perceptible to the touch; impalpable; imperceptible. Bp. Wilkins.
A corporation is an artificial, invisible, intangible being.
Marshall. — In*tan"gi*ble*ness, n. — In*tan"gi*bly, adv.
Intangle
(In*tan"gle) v. t. See Entangle.
Intastable
(In*tast"a*ble) a. Incapable of being tasted; tasteless; unsavory. [R.] Grew.
Integer
(In"te*ger) n. [L. integer untouched, whole, entire. See Entire.] A complete entity; a whole
number, in contradistinction to a fraction or a mixed number.
Complex integer (Theory of Numbers), an expression of the form a + b&radic-1, where a and b are
real integers.
Integrability
(In`te*gra*bil"i*ty) n. (Math.) The quality of being integrable.
Integrable
(In"te*gra*ble) a. (Math.) Capable of being integrated.
Integral
(In"te*gral) a. [Cf. F. intégral. See Integer.]
1. Lacking nothing of completeness; complete; perfect; uninjured; whole; entire.
A local motion keepeth bodies integral.
Bacon. 2. Essential to completeness; constituent, as a part; pertaining to, or serving to form, an integer; integrant.
Ceasing to do evil, and doing good, are the two great integral parts that complete this duty.
South. 3. (Math.) (a) Of, pertaining to, or being, a whole number or undivided quantity; not fractional. (b)
Pertaining to, or proceeding by, integration; as, the integral calculus.
Integral calculus. See under Calculus.
Integral
(In"te*gral), n.
1. A whole; an entire thing; a whole number; an individual.
2. (Math.) An expression which, being differentiated, will produce a given differential. See differential
Differential, and Integration. Cf. Fluent.
