scalar

As nouns the difference between array and scalar

is that array is clothing and ornamentation while scalar is (mathematics) a quantity that has magnitude but not direction; compare vector.

As a verb array

is to clothe and ornament; to adorn or attire.

As an adjective scalar is

(mathematics) having magnitude but not direction.

As adjectives the difference between modular and scalar

is that modular is consisting of separate modules; especially where each module performs or fulfills some specified function and could be replaced by a similar module for the same function, independently of the other modules while scalar is (mathematics) having magnitude but not direction.

As a noun scalar is

(mathematics) a quantity that has magnitude but not direction; compare vector.

As adjectives the difference between planar and scalar

is that planar is of or pertaining to a plane while scalar is (mathematics) having magnitude but not direction.

As a noun scalar is

(mathematics) a quantity that has magnitude but not direction; compare vector.

As nouns the difference between scalar and quantities

is that scalar is (mathematics) a quantity that has magnitude but not direction; compare vector while quantities is .

As an adjective scalar

is (mathematics) having magnitude but not direction.

As adjectives the difference between gradual and scalar

is that gradual is proceeding by steps or small degrees; advancing step by step, as in ascent or descent or from one state to another; regularly progressive; slow while scalar is having magnitude but not direction.

As nouns the difference between gradual and scalar

is that gradual is an antiphon or responsory after the epistle, in the Mass, which was sung on the steps, or while the deacon ascended the steps while scalar is a quantity that has magnitude but not direction; compare vector.

As nouns the difference between scalar and eigenvalue

is that scalar is (mathematics) a quantity that has magnitude but not direction; compare vector while eigenvalue is (linear algebra) a scalar, $\backslash lambda\backslash !$, such that there exists a vector $x$ (the corresponding eigenvector) for which the image of $x$ under a given linear operator $\backslash rm\; a\backslash !$ is equal to the image of $x$ under multiplication by $\backslash lambda$; ie $\{\backslash rm\; a\}\; x\; =\; \backslash lambda\; x\backslash !$.

As an adjective scalar

is (mathematics) having magnitude but not direction.

As an adjective scalar is

(mathematics) having magnitude but not direction.

As a noun scalar is

(mathematics) a quantity that has magnitude but not direction; compare vector.

In mathematics terms the difference between scalar and quantity

is that scalar is a quantity that has magnitude but not direction; compare vector while quantity is indicates that the entire preceding expression is henceforth considered a single object.

As an adjective scalar

is having magnitude but not direction.