# In circle M, diameters JL and HK each measure 16 centimeters. What is the approximate length of minor arc JH?

we all know that The components to calculate the circumference of a circle is the same as the place D is the diameter of the circle On this downside we’ve got Substitute within the components The whole circumference subtends for an angle measure of so by proportion Discover the arc size for an angle measure of Do not forget that The measure of the arc JH is the same as ——> by central angle Spherical to the  nearest tenth of a centimeter subsequently the reply is the approximate size of minor arc JH is

3.5 cm Step-by-step rationalization: The computation of the approximate size of minor arc JH is as follows As within the connected image we are able to see that circle M is proven additionally the minor arc measures 25 levels Now the circle size is = π × 16 = 50.26 cm. Now this size can be proportional to 360 levels Allow us to assume the minor size arc JH be x So, the equation can be
50.26 cm ÷  x cm = 360° ÷ 25°

Also Read :   Px + qy = r 2px – qy = 2r when solving this system of equations, x =

x = 50.26 × 25 ÷ 360

x = 3.5 cm

The reply is 3.5 cm, simply did it

A. 3.5 cm Step-by-step rationalization: Within the image connected, circle M is proven. From the image, minor arc JH measures 25°. The size of the circle is π*Diameter = π*16 = 50.26 cm. This size is proportional to 360°. To search out the size of minor arc JH, we’ve got to make use of the following proportion: 50.26 cm / x cm = 360° / 25° x = 50.26*25/360 x = 3.5 cm

50.2654824574 cm Arc JH = 25 and is (25 / 360) of the circle.arc size = (25 / 360) *  50.2654824574 cmarc size = 3.490658504 cm =3.5 cm (rounded)

3.5 cm Step-by-step rationalization: Within the image connected, circle M is proven. From the image, minor arc JH measures 25°. The size of the circle is π*Diameter = π*16 = 50.26 cm. This size is proportional to 360°. To search out the size of minor arc JH, we’ve got to make use of the following proportion: 50.26 cm / x cm = 360° / 25° x = 50.26*25/360 x = 3.5 cm

Also Read :   Which figure shows a line of reflectional symmetry for the letter T?