Description : In `Delta ABC`, if `/_A=80^(@)` and `AB=AC`, then `/_ B = ___________________`.
Last Answer : In `Delta ABC`, if `/_A=80^(@)` and `AB=AC`, then `/_ B = ___________________`.
Description : In `Delta ABC, /_ A= /_C= 50^(@)`. The longest side of `Delta ABC `is `__________________`.
Last Answer : In `Delta ABC, /_ A= /_C= 50^(@)`. The longest side of `Delta ABC `is `__________________`.
Description : The statement --- if forces acting on a point can be represented in magnitude and direction by the sides of a polygon taken in order then their resultant will be represented in magnitude and direction by the closing ... 's law of forces c.Law of polygon of forces d.D'Alembert's rule e.Lami's theorem
Last Answer : c. Law of polygon of forces
Description : Which is the correct statement about law of polygon of forces? (A) If any number of forces acting at a point can be represented by the sides of a polygon taken in order, then the ... direction and magnitude by the sides of a polygon taken in order, then the forces are in equilibrium
Last Answer : (D) If any number of forces acting at a point can be represented in direction and magnitude by the sides of a polygon taken in order, then the forces are in equilibrium
Description : ABCDE is not followed by F , then what ?
Last Answer : These are the names of vitamins , A will be K after ABCDE because there is no vitamin in the name of F.
Description : ABCD is a quadrilateral in which `/_A= 60^(@), /_ B= 70^(@), /_ C =110^(@)` and `/_ D =120^(@)`. The number of pairs of parallel lines is `"__________
Last Answer : ABCD is a quadrilateral in which `/_A= 60^(@), /_ B= 70^(@), /_ C =110^(@)` and ... )`. The number of pairs of parallel lines is `"________________"`.
Description : Which of the following is invalid? a) _a = 1 b) __a = 1 c) __str__ = 1 d) none of the mentioned
Last Answer : c) str = 1 In Python, __str__ is a special method that is used to define how an object should be represented as a string. It is a predefined method in Python and cannot be used as a ... those starting with __ are considered protected. They are valid names but have some specific uses in the code.
Description : Let X(n) represent the measure of one exterior angle of a regular polygon of n sides. What is the domain of this function?
Last Answer : Homework Questions Feel free to ask for help on your subject, but simply posting your homework question verbatim and expecting an answer is rude! We’re not here to do your homework for you. From https://www.fluther.com/help/guidelines/question-specific/
Description : How many diagonals can be drawn in a polygon of 15 sides? -Maths 9th
Last Answer : answer:
Description : How many sides does a 2520 angled polygon have?
Last Answer : 2
Description : When the number of sides of a polygon tends to infinity, it approaches _______.
Last Answer : When the number of sides of a polygon tends to infinity, it approaches _______.
Description : A circle is inscribed in a polygon. As the number of sides increases, the difference in areas of circle and polygon _________.
Last Answer : A circle is inscribed in a polygon. As the number of sides increases, the difference in areas of circle and polygon _________.
Description : The following table gives the number of sides and the number of diagonals of a polygon. `{:("Number of sides",3,4,5,6,7,8),("Number of diagonals",0,2,
Last Answer : The following table gives the number of sides and the number of diagonals of a polygon. `{:("Number of ... }` Write a formula to find in terms of n.
Description : The perimeter of a polygon is the ttal length of its sides. In a regular polygon of n sids with x as the length of a side, the perimeter P is________
Last Answer : The perimeter of a polygon is the ttal length of its sides. In a regular polygon of n sids with x as the length of a side, the perimeter P is________
Description : In the following figure a wire bent in the form of a regular polygon of `n` sides is inscribed in a circle of radius `a`. Net magnetic field at centre
Last Answer : In the following figure a wire bent in the form of a regular polygon of `n` sides is inscribed in a circle of ... (ni)/(a)mu_(0)tan.(pi)/(n)` D.
Description : If the exterior angle of a regular polygon equals 24 degrees how many sides does it have?
Last Answer : It will have 360/24 = 15 sides
Description : If the interior angle of a regular polygon is 162 degrees how many sides does it have?
Last Answer : It will have 20 sides
Description : How many sides does it have if a regular polygon has interior angles of 165 degrees?
Last Answer : Each exterior angle is 180-165 = 15 degrees and so it has 360/15= 24 sides
Description : How many sides does a regular polygon have if each exterior angle is 15 degrees?
Last Answer : 24 sides
Description : If the sum of interior angles of a polygon is 4680 degrees how many sides does the polygon have?
Last Answer : 15 sides
Description : What is formed by two consecutive sides of a polygon?
Last Answer : They form a vertex of the polygon.
Description : If the number of sides of a polygon is increased by five by how much would the sum of the interior angles of the polygon increase?
Last Answer : By 900 degrees as for example a triangle has 3 sides that add upto 180 degrees then if 5 sides are added to it then it then is an 8sided octagon with interior angles that add up to 1080 degrees
Description : If the exterior angle of a regular polygon is 108 degrees how many sides does the polygon have?
Last Answer : That's true if the interior angles are 108 degrees, but aregular polygon cannot have exterior angles of 108 degrees.
Description : How many sides does a regular polygon have if the measure of one interior angle is 105?
Last Answer : Such a polygon is not possible because it would have 4.8 sides.Angles on a straight line are 180 degrees and 105+75 = 180Angles around a polygon are 360 degrees and 360/75 = 4.8
Description : If the sum of the measures of the interior angles of a polygon is 1980 how many sides does it have?
Last Answer : The formula for the sum of the angles of an interior polygon is180(n-2), where n is the number of sides, so then you solve180(n-2) = 1980.(n-2) = 11n = 13.So the polygon has 13 sides.
Description : What is the exterior angle of a regular polygon with 13 sides?
Last Answer : Each exterior angle is 360/13 = 27.7 degrees rounded to 1decimal place
Description : How do you work out the exterior and interior angles of a regular polygon with W sides?
Last Answer : Exterior angle regular polygon = 360° ÷ number of sides = 360° ÷WInterior angle regular polygon = 180° - exterior angle regularpolygon= 180° - (360° ÷ number of sides )= 180° - (360° ÷ W)
Description : How many sides doe the polygon have if the sum of the interior angle of a polygon is 1800 degrees?
Last Answer : It will have (1800+360)/180 = 12 sides
Description : If a regular polygon has exterior angles that measure 60 each how many sides does the polygon have?
Last Answer : It has 360/60 = 6 sides
Description : If an exterior angle of regular polygon measures 15 how many sides does it have?
Last Answer : It has 360/15 = 24 sides
Description : What is a polyhedron having a polygon for a base and triangular sides with a common vertex?
Last Answer : A pyramid fits the given description
Description : What would the total sum of the interior angles be for a polygon with 20 sides?
Last Answer : The sum of the interior angles of any regular polygon of n sides is equal to 180(n - 2) degrees. 3240 degrees
Description : How many sides does a regular polygon have if each angle measures 144 degrees?
Last Answer : We have the interior angle 144∘ . We can find the number of sides using the formula as follows. Thus, the polygon has 10 angles and 10 sides.
Description : In figure, ABCDE is any pentagon. BP drawn parallel to AC meets DC produced at P and EQ drawn parallel to AD meets CD produced at Q. -Maths 9th
Last Answer : Given ABCDE is a pentagon. BP || AC and EQ|| AD. To prove ar (ABCDE) = ar (APQ) Proof We know that, triangles on the same base and between the same parallels are equal in area. Here, ΔADQ and ΔADE lie on the ... ar (ΔACD) = ar (ΔADE) + ar (ΔACB) + ar (ΔACD) ⇒ ar (ΔAPQ) = ar (ABCDE) Hence proved.
Description : In Fig. 9.30, ABCDE is any pentagon. BP drawn parallel to AC meets DC produced at P and EQ drawn parallel to AD meets CD produced at Q. Prove that ar (ABCDE) = ar(APQ). -Maths 9th
Last Answer : hope its clearhope its clear
Description : In the metabolic pathway, ABCDE, discuss what effect molecule E would likely have on regulating the enzyme that catalyzes the reaction of A to B?
Last Answer : E is the product. If there is enough of molecule E to complete a chemical process, for example, the molecules (reactants) ABCDE will not be needed, and therefore an excess of E means less of ABCDE produced.
Description : what- Nathan is carving the letter N out of wood. Is he able to determine if the sides of the N are parallel (yes or no)?
Last Answer : yes
Description : What polygon does the sum of the measures of interior angles equal the sum of the measures of the exterior angles?
Last Answer : A 4 sided quadrilateral has interior angles that add up to 360degrees and its exterior angles add up to 360 degrees
Description : 14. When the pipes are in series, the total head loss is equal to the sum of the head loss in each pipe A) Yes B) No
Last Answer : A
Description : Can hatred be the reason to destroy the world? a) Yes b) No c) May be d) May not be
Last Answer : c) Alliteration
Description : NaHCO 3 + HCl NaCl + H 2 O +CO 2 is the correct chemical reaction happening inside stomach when child takes antacid. (a) Yes (b) No (c) May be
Last Answer : (a) Yes
Description : The metallic sheath may be made of lead or lead alloy or of aluminium. (a) Yes (b) No
Last Answer : (b) No
Description : May sockets be provided in the wall of a fitting? a) No. b) Yes. c) Yes, in accordance with ASME B16.5, figure 4. d) Yes, as permitted in ASME B16.20.
Last Answer : c) Yes, in accordance with ASME B16.5, figure 4.
Description : If two opposite sides of a cyclic quadrilateral are parallel , then prove that - (a) remaining two sides are equal (b) both the diagonals are equal -Maths 9th
Last Answer : Let ABCD be quadrilateral with ab||cd Join be. In triangle abd and CBD, Angle abd=angle cdb(alternate angles) Anglecbd=angle adb(alternate angles) Bd=bd(common) Abd=~CBD by asa test Ad=BC by cpct Since ad ... c(from 1) Ad =bc(proved above) Triangle adc=~bcd by sas test Ac=bd by cpct Hence proved
Description : ‘If two sides and an angle of one triangle are equal to two sides and an angle of another triangle , then the two triangles must be congruent’. -Maths 9th
Last Answer : No, because in the congruent rule, the two sides and the included angle of one triangle are equal to the two sides and the included angle of the other triangle i.e., SAS rule.
Description : If a pair of opposite sides of a cyclic quadrilateral are equal, then prove that its diagonals are also equal. -Maths 9th
Last Answer : Given Let ABCD be a cyclic quadrilateral and AD = BC. Join AC and BD. To prove AC = BD Proof In ΔAOD and ΔBOC, ∠OAD = ∠OBC and ∠ODA = ∠OCB [since, same segments subtends equal angle to the circle] AB = BC [ ... is DOC on both sides, we get ΔAOD+ ΔDOC ≅ ΔBOC + ΔDOC ⇒ ΔADC ≅ ΔBCD AC = BD [by CPCT]