If angle of sector is 60 radius is 3.5
Web10 apr. 2024 · The area of a sector is given by the formula, lr 2, where l is the length of an arc and r is the radius of the circle. On, substituting the values of l and r, we get A = (3.5)(5) 2 On solving the expression, we get, A = 17.5 2 Thus the area of the sector of length 3.5 cm formed by the circle of radius 5 cm is 8.75 cm2. Web24 feb. 2024 · If angle of sector is 60°, radius is 3.5 cm then length of the arc is - 35797252. Sharmagaurav3072 Sharmagaurav3072 24.02.2024 Math Secondary School ... from the top of a tree of height 13 M the angle of elevation and depression of the top and bottom of another tree or 45 degree and 30 degree respectiv ...
If angle of sector is 60 radius is 3.5
Did you know?
WebAnswer (1 of 5): The arc length is (80/360)C, where C is the circumference of the circle. C = 2(pi)r = 2(pi)11 = 22(pi) So, the arc length = (80/360)[22(pi)] = 4.88889(pi) = 15.36. Conclusion: The arc length is 15.36 inches (approximately). Eddie-G… WebFind the area of the sector of a circle of radius 5 cm, if the corresponding arc length is 3.5 cm. CBSE English Medium Class 10. Question Papers 939. Textbook ... Let the central angle of the sector be θ. Given that, radius of the sector of a circle (r) = 5 cm And arc length `(l)` = 3.5 cm.
Web10 okt. 2024 · What is the perimeter of sector whose angle is 60° and the diameter is 21 cm askedFeb 27, 2024in Aptitudeby Pravask(30.0kpoints) quantitative-aptitude geometry 0votes 1answer A sector is cut off from a circle of radius 21 cm. The angle of the sector is 40 degrees. Find the area of the sector in square cm? WebAs established, the only two measurements needed to calculate the area of a sector are its angle and radius. For example, if the angle is 45° and the radius 10 inches, the area is …
Web3.5 = (θ/360°) (2π) (5) 3.5 = (θ/360°) (2) (22/7) (5) θ/360° = 3.5 (7)/ (22) (10) θ/360° = 24.5/220 θ/360° = 0.1114 Area of sector = πr²θ/360° = (22/7) (5)² (0.1114) = 61.27/7 = 8.75 cm² Therefore, the area of the sector is 8.75 cm². Try This: Find the area of the sector of a circle of radius 3 cm, if the corresponding arc length is 7 cm. WebIf we want to find the length of the arc of any sector then we need a formula- Length of the arc of sector = (θ/360º)×2πr Where, θ = Angle of sector r = Radius of arc or circle π = 22/7 or 3.14 We put all the values in formula & find the length of the arc. THANK YOU… Cynthia Fuller Former Nurse at Loma Linda University Medical Center Updated Mar 3
WebFind the area of the sector of a circle of radius 5 cm, if the corresponding arc length is 3.5 cm. Login. Study Materials. NCERT Solutions. NCERT Solutions For Class 12. NCERT Solutions For Class 12 Physics; ... We know, l=r(x) where x is angle subtended by sector So, 3.5=5(x) x=0.7
WebWhat is the perimeter of the sector of radius 3.5cm which subtends an angle of 45° at the center of the circle? - Quora Answer (1 of 11): 45°=\frac{\pi}{4} radians. … open buildings designer raceway trunkingWebIf the Length of an Arc of the Sector of a Circle is 20 Cm and If the Radius is 7 Cm, Find the Area of the Sector. Maharashtra State Board SSC (Marathi Semi-English) 10th Standard [इयत्ता १० वी] Question ... Area of sector of radius 7cm and angle θ = `3600/(7pi)` is = `pir^2(θ/360)` = `22/7 xx (7)^2 xx 3600/(7 xx 22/7 xx 360)` iowa low income cell phoneWeb14 feb. 2024 · To find the central angle of a sector of a circle, you can invert the formula for its area: A = r² · α/2, where: r — The radius; and; α — The central angle in radians. The formula for α is then: α = 2 · A/r². To … iowa low income elderly tax creditWeb29 dec. 2024 · With a central angle in degrees, it's 2 times pi times the radius (that's the circumference formula) times n/360, where n is the central angle. With radians, it's just the radius times the angle ... iowa low income energy assistance programWebIn the figure, chord AB subtends an angle of 60°^ (@) at the centre of the circle of radius 3.5 cm. Find the (a) length of the arc APB (b) the area of the sector AOB (C) area of the … openbuilds cam tutorialWeb30 aug. 2024 · = (√3 /4) × 144 = 36√3 cm2 = 62.354 cm2 Now, Central angle of the sector AOBCA = ∅ = 60° = (60π / 180) = (π/3) radians Thus, area of the sector AOBCA = ½ r2 ∅ = ½ × 122 × π/3 = 122 × (22 / (7×6)) = 75.36 cm2 Now, Area of the segment ABCA = Area of the sector AOBCA – Area of the triangle AOB = (75.36 – 62.354) cm2 = 13.006 cm2 openbuildingsbbes electrical designWeb14 mrt. 2024 · Area of the circle = π (OA) 2 = 3.14 × 10 2 = 314 cm 2 Area of sector AOB = (60° / 360°) × 314 = 314 / 6 cm 2 = 52.33 cm 2 Area of Δ AOB = (√ 3 / 4 ) × AB 2 = (1.732 / 4 ) × 10 2 = 43.3 cm 2 Area of minor segment ACB = Area of sector AOB - Area of Δ AOB ⇒ 52.33 - 43.3 cm 2 = 9.03 cm 2 openbuildings designer free download