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In the diagram, given below, triangle ABC is right-angled at B and BD is perpendicular to AC. Find :

(i) cos ∠DBC

(ii) cot ∠DBA

In the diagram, given below, triangle ABC is right-angled at B and BD is perpendicular to AC. Find : Trigonometrical Ratios, Concise Mathematics Solutions ICSE Class 9.

Trigonometric Identities

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Answer

In Δ ABC,

⇒ AC2 = AB2 + BC2 (∵ AC is hypotenuse)

⇒ AC2 = 122 + 52

⇒ AC2 = 144 + 25

⇒ AC2 = 169

⇒ AC = 169\sqrt{169}

⇒ AC = 13

In the diagram, given below, triangle ABC is right-angled at B and BD is perpendicular to AC. Find : Trigonometrical Ratios, Concise Mathematics Solutions ICSE Class 9.

Let ∠CBD be .

So, ∠DBA = 90° - x°.

In Δ DAB, according to angle sum property

⇒ ∠ DAB + ∠ADB + ∠DBA = 180°

⇒ ∠ DAB + 90° + (90° - x°) = 180°

⇒ ∠ DAB + 180° - x° = 180°

⇒ ∠ DAB - x° = 0

⇒ ∠ DAB = x°

From figure,

∠ DAB = ∠ CAB = x°

∴ ∠ CBD = ∠ CAB = x°

(i) cos ∠DBC = cos ∠CAB = BaseHypotenuse\dfrac{Base}{Hypotenuse}

=ABAC=1213= \dfrac{AB}{AC}\\[1em] = \dfrac{12}{13}

Hence, cos ∠DBC = 1213\dfrac{12}{13}.

(ii) In Δ BCD, according to angle sum property

⇒ ∠ DBC + ∠DCB + ∠CDB = 180°

⇒ ∠ DCB + x° + 90° = 180°

⇒ ∠ DCB = 180° - 90° - x°

⇒ ∠ DCB = 90° - x°

From figure,

∠ DCB = ∠ ACB = 90° - x°

∴ ∠ DBA = ∠ ACB = 90° - x°

cot ∠DBA = cot ∠ACB = BasePerpendicular\dfrac{Base}{Perpendicular}

=BCAB=512= \dfrac{BC}{AB}\\[1em] = \dfrac{5}{12}

Hence, cot ∠DBA = 512\dfrac{5}{12}.

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