This time we are looking on the crossword clue for: Digs.
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Possible Answers: PAD, LIKES, BARBS, GIBES, ABODE, HOME, CRIB, PADS, ROOTS, ADORES, MINES, ISINTO, GETSIT, INSULTS, POTSHOTS, RELATESTO, LODGINGS, BURROWS, VOLLEYBALLMOVES, TAUNTINGREMARKS, HIPPIESLODGINGS, EXCAVATIONSITES, ARCHAEOLOGYJOBS.
Last seen on: –LA Times Crossword 23 Sep 21, Thursday
–NY Times Crossword 27 Jul 21, Tuesday
–Newsday.com Crossword – Aug 8 2020
–NY Times Crossword 21 Dec 19, Saturday
–LA Times Crossword 15 Sep 18, Saturday
–NY Times Crossword 19 Aug 2018, Sunday
–Newsday.com Crossword – Jul 14 2018
-NY Times Crossword 1 Dec 2017, Friday
Random information on the term “PAD”:
Writing pad may refer to:
Random information on the term “HOME”:
Affordable housing is housing which is deemed affordable to those with a median household income as rated by country, State (province), region, or municipality by a recognized Housing Affordability Index. In Australia, the National Affordable Housing Summit Group developed their definition of affordable housing as housing that is, “…reasonably adequate in standard and location for lower or middle income households and does not cost so much that a household is unlikely to be able to meet other basic needs on a sustainable basis.” In the United Kingdom affordable housing includes “social rented and intermediate housing, provided to specified eligible households whose needs are not met by the market.” Most of the literature on affordable housing refers to mortgages and number of forms that exist along a continuum – from emergency shelters, to transitional housing, to non-market rental (also known as social or subsidized housing), to formal and informal rental, indigenous housing and ending with affordable home ownership.
Random information on the term “PADS”:
Pads (also called leg guards) are protective equipment used by batters in the sports of cricket and baseball, and by goaltenders in hockey, bandy and lacrosse. They serve to protect the legs from impact by a hard ball or puck at high speed which could otherwise cause injuries to the lower leg.
In cricket, pads fall into two types, batting pads and wicket-keeper’s pads. In Test and first-class cricket, the pads are white (to match the rest of the player’s whites), while in limited overs cricket they may be coloured.
Cricket pads first appeared in the mid 18th century in England. They were developed to protect the lower part of the legs from the hard leather ball that was used to bowl deliveries in the game. The development of pads led to a change in the Laws of Cricket with the addition of the dismissal for LBW. It was introduced in 1774 because batsmen had begun using their pads to deflect balls away from their wickets.
Batting pads protect the shins, knees and the lower thigh. At the base, there is a slot for the foot. Traditional pads were made from canvas which had cotton stuffing inserted between stitched-in cane wood strips that ran vertically up to the knee roll. The material would then be painted white with water-soluble canvas paint. Leather buckles were used to bind the pad to the leg. These natural material pads were quite heavy. By contrast, modern day pads are now made from durable and ultra light synthetic materials such as PVC for the outer and polyesters for the lining. Most pads use three velcro fastening straps making them easily adjustable and removable.
Random information on the term “ROOTS”:
In mathematics, a zero, also sometimes called a root, of a real-, complex- or generally vector-valued function f is a member x of the domain of f such that f(x) vanishes at x; that is, x is a solution of the equation
In other words, a “zero” of a function is an input value that produces an output of zero (0).
A root of a polynomial is a zero of the corresponding polynomial function. The fundamental theorem of algebra shows that any non-zero polynomial has a number of roots at most equal to its degree and that the number of roots and the degree are equal when one considers the complex roots (or more generally the roots in an algebraically closed extension) counted with their multiplicities. For example, the polynomial f of degree two, defined by
has the two roots 2 and 3, since
If the function maps real numbers to real numbers, its zeroes are the x-coordinates of the points where its graph meets the x-axis. An alternative name for such a point (x,0) in this context is an x-intercept.