the area of a right angled triangle is 80 sq cm. one of the perpendicular sides is 20 cm long. what is the length of the other?
Answers
SIMILAR ANSWER
Step-by-step explanation:
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bh
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:96 cm² = (1/2)(16 cm)h
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:96 cm² = (1/2)(16 cm)h96 cm² = (8 cm)h
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:96 cm² = (1/2)(16 cm)h96 cm² = (8 cm)h(96 cm²)/(8 cm) = [(8 cm)h]/(8 cm)
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:96 cm² = (1/2)(16 cm)h96 cm² = (8 cm)h(96 cm²)/(8 cm) = [(8 cm)h]/(8 cm)(96 cm²)/(8 cm) = [(8 cm)/(8 cm)]h
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:96 cm² = (1/2)(16 cm)h96 cm² = (8 cm)h(96 cm²)/(8 cm) = [(8 cm)h]/(8 cm)(96 cm²)/(8 cm) = [(8 cm)/(8 cm)]h12 cm = [1]h
Since the legs of a right triangle are perpendicular to each other, then depending on how the triangle is oriented, one leg can function as the base of length b and the other leg can serve as the altitude of height h.The formula for the area A of a triangle is given by the formula:A = (1/2)bhSince we're given that A = 96 cm², and, let's say, b = 16 cm (We could have said let h = 16 cm), then substituting into the above formula, we get:96 cm² = (1/2)(16 cm)h96 cm² = (8 cm)h(96 cm²)/(8 cm) = [(8 cm)h]/(8 cm)(96 cm²)/(8 cm) = [(8 cm)/(8 cm)]h12 cm = [1]hh = 12 cm is the length of the other side (leg) of the given right triangle.