4 sin(x) - 3 = 0
Therefore sin(x) = 3/4
And so the primary solution is x = sin-1(3/4) = 49 deg
The second solution in the domain is 180 - 49 = 131 deg.
We know that sin @ = h/l is the basic principle of working of sine bar.Differentiating above equation,.. . cos @ . d@ = l.dh - h.dl_________ l*ld@ =tan@(dh/l - dl/l)This indicate that error is a function of tan @ and below 45 degree error is smaller which suddenly increases above 45 degree. because of this reason sine bar is preferred for measuring angle below 45
In a circle ,there are 4 quadrants,each quadrant have 90 degree angle, therefore 4x90=360 degree so 361 degree angle will be in first quadrant.
An airplane flying at an altitude of 2600m, approaching an airport runaway located 48km away, is descending at an angle of 3.1 degrees, rounded to the nearest tenth of a degree. Construct a right triangle. Horizontal is 48. Verticle (opposite) is 2.6. Hypoteneuse is 48.07 by pythagorean theorem. The inverse sine of (2.6 / 48.07) is 3.1 degrees.
Note: When doing trigonometry, it is highly recommeded that you have a scientific calculator at hand. Also, make sure your calculator is in Degree (D or Deg) mode and not Radian (R or Rad). To find the cosine of 70o, press 'cos', then type in 70, then press equals. You should get 0.342 (to the nearest 3 decimal places).
There are 360 degrees around a circle. So first find the circumference of the circle and then divide it by 360 which will give 1 degree of distance and then multiply this by 50 to show how far the spider crawled: Circumference = 100*pi 1 degree = (100*pi)/360 = 5/18*pi Distance crawled = 50*5/18*pi = 43.6332313 inches Answer: 44 inches to the nearest inch.
It's a simple first-degree equation in 'x'.Its solution is [ x = 5 ].
Niels Henrik Abel proved that there is no general solution to the quintic equation (5th. degree polynomial) with radicals.
a linear equation
The answer will depend on the degree of rounding. To the nearest ten or hundred (or more) the answer is ZERO.To the nearest integer it is 2.The answer will depend on the degree of rounding. To the nearest ten or hundred (or more) the answer is ZERO.To the nearest integer it is 2.The answer will depend on the degree of rounding. To the nearest ten or hundred (or more) the answer is ZERO.To the nearest integer it is 2.The answer will depend on the degree of rounding. To the nearest ten or hundred (or more) the answer is ZERO.To the nearest integer it is 2.
The highest power in the equation.
the name is squared equation
The angle would be .4 if you rounded it to the nearest 10th degree
An equation with a degree of 2 is called a quadratic equation. At least one term in the equation will have a variable raised to the second power, e.g. x²
The answer depends on the degree to which the number is to be rounded.Rounded to the nearest unit is 35121.Rounded to the nearest million it is 0.The answer depends on the degree to which the number is to be rounded.Rounded to the nearest unit is 35121.Rounded to the nearest million it is 0.The answer depends on the degree to which the number is to be rounded.Rounded to the nearest unit is 35121.Rounded to the nearest million it is 0.The answer depends on the degree to which the number is to be rounded.Rounded to the nearest unit is 35121.Rounded to the nearest million it is 0.
It's a first-degree equation in 'b' . To solve the equation in two steps: 1). Subtract 26.8 from each side of the equation. 2). Divide each side of the equation by 4.6 . 3). If your solution is not [ b = 5.2 ], go back to Step-1 and repeat until you do it correctly.
It's a trivial first degree equation in 'y'.Here is the solution to it:-y = -10Multiply each side by -1 :y = 10
It depends on the degree of rounding required. To the nearest whole numbers or nearest thousands, for example, they would remain unchanged.It depends on the degree of rounding required. To the nearest whole numbers or nearest thousands, for example, they would remain unchanged.It depends on the degree of rounding required. To the nearest whole numbers or nearest thousands, for example, they would remain unchanged.It depends on the degree of rounding required. To the nearest whole numbers or nearest thousands, for example, they would remain unchanged.